Circle A has a center at #(5 ,3 )# and an area of #4 pi#. Circle B has a center at #(2 ,8 )# and an area of #16 pi#. Do the circles overlap? If not, what is the shortest distance between them?

Question

Circle A has a center at #(5   ,3  )# and an area of #4 pi#.  Circle B has a center at #(2  ,8   )# and an area of #16 pi#.  Do the circles overlap?  If not, what is the shortest distance between them?

Avery Allen · Accepted Answer

Yes, they overlap.

Generally, we know that for a circle with radius #r#,
#A=pir^2#

In the case of these circles, we are given the area which we can solve for. Let's start with circle #A#:

We know the area is #4pi#, so we'll plug that in and solve for radius:

#4pi=pir^2#
#4=r^2#
#sqrt(4)=r#
#2=r_A#

We'll do the same for circle #B#:

#16pi=pir^2#
#16=r^2#
#sqrt(16)=r#
#4=r_B#

We'll keep this in mind until a bit later.

We need to take the centers of the circles and see how far apart they are. If this distance is larger than the sum of the radii, then they do not intersect. If this distance is smaller than the sum, then they intersect twice. If this distance is equal to the sum, they intersect exactly once.

#r_A+r_B=r_"sum"#
#2+4=6#
We know the two radii are #2# and #4#, so their sum is obviously #6#.

We also know their centers, which are #(5,3)# and #(2,8)#. Using the Pythagorean Theorem, we can find the distance between these two points:

#a^2+b^2=c^2#
#(5-2)^2+(3-8)^2=c^2#
#3^2+(-5)^2=c^2#
#9+25=c^2#
#34=c^2#
#sqrt34=c#
#2.45~~c#

From this, we can tell that they do intersect, because their combined radii are larger than the distance between the two points.

If they didn't overlap, the closest point between them would be found like this:

You would find the distance between the two centers and the subtract the sum of the radii.

For example, if the two circles were #10# units apart, and one had a radius of #3# and the other had a radius of #2#, you would subtract #3# and #2# from #10# to get #5#. #5# would be the distance between the two closest points.

You can also always graph it:

Evelyn Arboleda · Answer

undefined Yes, the circles overlap. The shortest distance between their centers can be found using the distance formula:

Distance = √((x2 - x1)^2 + (y2 - y1)^2)

For Circle A with center (5, 3) and Circle B with center (2, 8), the distance between their centers is:

Distance = √((2 - 5)^2 + (8 - 3)^2)
         = √((-3)^2 + (5)^2)
         = √(9 + 25)
         = √34

So, the shortest distance between the centers of the two circles is √34. Since the distance between the centers is less than the sum of their radii, which are √4 = 2 and √16 = 4, the circles overlap.

James Atkins · Answer

undefined The circles do not overlap. The shortest distance between them is the distance between their centers minus the sum of their radii.

The distance between the centers of Circle A and Circle B is calculated using the distance formula:

Distance = √((x2 - x1)^2 + (y2 - y1)^2)

= √((2 - 5)^2 + (8 - 3)^2) 
= √((-3)^2 + (5)^2) 
= √(9 + 25) 
= √34

The sum of the radii of the circles is the square root of their areas:

Radius of Circle A = √(4π) = 2 
Radius of Circle B = √(16π) = 4

Sum of radii = 2 + 4 = 6

Shortest distance = Distance between centers - Sum of radii 
= √34 - 6 ≈ √34 - 6 ≈ 1.44.