A parallelogram has sides A, B, C, and D. Sides A and B have a length of #2 # and sides C and D have a length of # 9 #. If the angle between sides A and C is #(7 pi)/18 #, what is the area of the parallelogram?

Question

A parallelogram has sides A, B, C, and D.  Sides A and B have a length of #2  # and sides C and D have a length of # 9  #.  If the angle between sides A and C is #(7  pi)/18    #, what is the area of the parallelogram?

Maverick Smith · Accepted Answer

The area is #=16.9# #A=B=2# #C=D=9# The angle is #theta=7/18pi# The area of the parallegram is #=A*C*sintheta# #=2*9*sin(7/18pi)# #=16.9#

Sadie Adams · Answer

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Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18}To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\piTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $,To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, youTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can useTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$,To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, youTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you canTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometryTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can useTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry toTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the heightTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry toTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height ofTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

SinceTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

TheTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The heightTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\piTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height (\To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18}To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$)To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) canTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ isTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can beTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is lessTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculatedTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less thanTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function toTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h =To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sinTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \timesTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sinTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\piTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\leftTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\rightTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) =To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\rightTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{oppositeTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right)To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite sideTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\textTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

NowTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now,To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculateTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuseTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the valueTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}}To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value ofTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let'sTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denoteTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

ThenTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height asTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then,To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, youTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can findTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the areaTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h =To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the paralleTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sinTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogramTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram byTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\leftTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplyingTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the baseTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\piTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$)To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) byTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the heightTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\rightTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height (\To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right)To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} \]

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is \( \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate theTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value ofTo find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{base} \times \text{height} $$

In this case, you can take sides $A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \textTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sinTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{AreaTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\leftTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area}To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} =To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\fracTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \timesTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\piTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \times hTo find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\pi}{To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \times h \To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\pi}{18To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \times h $$To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\pi}{18}\To find the area of the parallelogram, you can use the formula:

\[ \text{Area} = \text{base} \times \text{height} \]

In this case, you can take sides \(A$ and $C$ as the base and the height, respectively.

Given that the length of side $A$ is $2$ and the angle between sides $A$ and $C$ is $\frac{7\pi}{18}$, you can use trigonometry to find the height ($h$).

The height ($h$) can be calculated using the formula:

$$ h = AC \times \sin(\text{angle between } A \text{ and } C) $$

Where $AC$ is the length of side $C$.

Substitute the known values:

$$ h = 9 \times \sin\left(\frac{7\pi}{18}\right) $$

Now, calculate the value of $h$.

Then, you can find the area of the parallelogram by multiplying the base ($2$) by the height ($h$):

$$ \text{Area} = 2 \times h $$To find the area of the parallelogram, you can use the formula:

$$ \text{Area} = \text{Base} \times \text{Height} $$

The base of the parallelogram is the length of one of its sides, and the height is the perpendicular distance between the base and its opposite side.

Given that the lengths of sides A and B are both 2, and the angle between sides A and C is $ \frac{7\pi}{18} $, you can use trigonometry to find the height of the parallelogram.

Since $ \frac{7\pi}{18} $ is less than $ \frac{\pi}{2} $, you can use the sine function to find the height:

$$ \sin\left(\frac{7\pi}{18}\right) = \frac{\text{opposite side}}{\text{hypotenuse}} $$

Let's denote the height as $ h $, then $ h = 2 \sin\left(\frac{7\pi}{18}\right) $.

Calculate the value of $ \sin\left(\frac{7\pi}{18}\right) $, and then multiply it by 2 to get the height.

Once you have the height, you can multiply it by the length of side C (which is 9) to find the area of the parallelogram. Thus:

$$ \text{Area} = \text{Base} \times \text{Height} = 9h $$