2 Answers

Michael Bylstra · Answer 1 · 2022-03-03T22:28:49+0000

Answer:

$\displaystyle B )\overline{ \text{QR }}= 17.6 cm$

Explanation:

we have two similar triangles

we want to figure out the measure of QR

remember that,

the ratio of the corresponding sides of two similar triangles is equal

thus,

$\displaystyle (8 .8)/(QR) = (5.2)/(10.4)$

cross multiplication:

$\displaystyle5.2 QR = 91.52$

divide both sides by 5.2:

$\displaystyle (5.2 QR )/(5.2)= ( 9 1.52)/(5.2)$

simplify division:

$\displaystyle QR = 17.6 cm$

hence, our answer is B

Osama Naeem · Answer 2 · 2022-03-07T02:13:48+0000

Answer:

|QR| = 17.6

Explanation:

To answer this we need to show that the triangles are similar or to assume that they are similar.

Note the following:

1. The ratio of the longest sides is 12.5 to 25.0, or 1/2;

2. The ratio of the shortest sides is 5.2 to 10.4, or 1/2

Therefore the ratio of the longer legs is 8.8 to QR, also equal to 1/2

8.8 1

-------- = -----

QR 2

Cross-multiplying, we get |QR| = 17.6

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