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Question 923778: A triangle has sides of 4, 9, and 12. In a similar triangle the shortest side is 12 and the longest is x. (a) write a proportion that models the situation
(b) solve the proptiortion for x
Answer by math-vortex(648)   (Show Source):
You can put this solution on YOUR website!
Hi, there---
Problem:
A triangle has sides of 4, 9, and 12. In a similar triangle the shortest side is 12 and the longest is x.
(a) write a proportion that models the situation
(b) solve the proptiortion for x
Solution:
(a) Similar triangles has the same shape, and the corresponding sides differ by a common scale factor.
Since 12 is the shortest side in the similar triangle, it is proportional to the side of 4 in the original triangle.
Since x is the longest side in the similar triangle, it is proportional to the side of 12 in the original triangle.
Therefore, one possible proportion is
[similar shortest] / [original shortest] = [similar longest] / [original longest]
or
12/4 = x/12
(b) To solve the proportion, multiply both sides of the equation (proportion) by 12 to isolate x.
144/4 = x
Divide 144 by 4.
36 = x
The longest side of the similar triangle is 36.
Hope this helps. Feel free to email if you have questions about the solution.
Mrs. F
math.in.the.vortex@gmail.com
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