Triangle A has an area of #15 # and two sides of lengths #4 # and #9 #. Triangle B is similar to triangle A and has a side of length #7 #. What are the maximum and minimum possible areas of triangle B?

Answer 1

There's a possible third side of around #11.7# in triangle A. If that scaled to seven we'd get a minimal area of #735/(97 + 12 sqrt(11))#.

If the side length #4# scaled to #7# we'd get a maximal area of #735/16.#

This is perhaps a trickier problem than it first appears. Anybody know how to find the third side, which we seem to need for this problem? Normal trig usual makes us calculate the angles, making an approximation where none is required.

It's not really taught in school, but the easiest way is Archimedes' Theorem, a modern form of Heron's Theorem. Let's call A's area #A# and relate it to A's sides #a,b# and #c.#
#16A^2 = 4 a^2 b^2 - (c^2 - a^2 - b^2)^2#
#c# only appears once, so that's our unknown. Let's solve for it.
# (c^2 - a^2 - b^2)^2 = 4 a^2 b^2 - 16A^2 #
#c^2 = a^2 + b^2 \pm sqrt{4 a^2 b^2 - 16A^2}#
We have #A=15, a=4, b=9.#
# c^2 = 4^2+9^2 \pm sqrt{4 (4^2) (9^2) - 16(15)^2} = 97 \pm sqrt{ 1584}#
#c = sqrt{ 97 \pm 12 sqrt{11} } #
#c approx 11.696 or7.563#
That's two different values for #c#, each of which should give rise to a triangle of area #15#. The plus sign one is of interest to us because it's larger than the other two sides.
For maximal area, maximal scaling, that means the smallest side scales to #7#, for a scale factor of #7/4# so a new area (which is proportional to the square of the scale factor) of #(7/4)^2(15) = 735/16#
For minimal area the largest side scales to #7# for a new area of
# 15 (7/ (sqrt{ 97 + 12 sqrt{11} } ) )^2 = 735/(97 + 12 sqrt(11))#
Sign up to view the whole answer

By signing up, you agree to our Terms of Service and Privacy Policy

Sign up with email
Answer 2

The maximum possible area of triangle B is ( \frac{15 \times 7^2}{9^2} = \frac{735}{9} ), which is approximately 81.67 square units. The minimum possible area of triangle B is ( \frac{15 \times 7^2}{4^2} = \frac{735}{16} ), which is approximately 45.94 square units.

Sign up to view the whole answer

By signing up, you agree to our Terms of Service and Privacy Policy

Sign up with email
Answer from HIX Tutor

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

Not the question you need?

Drag image here or click to upload

Or press Ctrl + V to paste
Answer Background
HIX Tutor
Solve ANY homework problem with a smart AI
  • 98% accuracy study help
  • Covers math, physics, chemistry, biology, and more
  • Step-by-step, in-depth guides
  • Readily available 24/7