QUESTION IMAGE
Question
(a) complete the congruence statements below.
$\angle p\cong$ (choose one)
$\angle q\cong$ (choose one)
$\angle r\cong$ (choose one)
(b) find the following ratios.
write your answers as fractions in simplest form.
$\frac{ac}{pq}=\square$
$\frac{cb}{qr}=\square$
$\frac{ab}{pr}=\square$
(c) select the true statement.
$\circ \triangle pqr$ and $\triangle acb$ are similar.
Step1: Match sides for similarity
First, order the sides of each triangle by length:
- $\triangle PQR$: $PQ=12$, $QR=20$, $PR=24$
- $\triangle ACB$: $AC=21$, $CB$ (unknown, but we use proportionality), $AB=42$
Find the scale factor: $\frac{AC}{PQ}=\frac{21}{12}=\frac{7}{4}$, $\frac{AB}{PR}=\frac{42}{24}=\frac{7}{4}$. So the corresponding angles are:
$\angle P \cong \angle C$, $\angle Q \cong \angle A$, $\angle R \cong \angle B$
Step2: Calculate side ratios
Ratio 1: $\frac{AC}{PQ}$
$\frac{AC}{PQ}=\frac{21}{12}=\frac{7}{4}$
Ratio 2: $\frac{CB}{QR}$
First find $CB$: since scale factor is $\frac{7}{4}$, $CB=20\times\frac{7}{4}=35$. Then $\frac{CB}{QR}=\frac{35}{20}=\frac{7}{4}$
Ratio 3: $\frac{AB}{PR}$
$\frac{AB}{PR}=\frac{42}{24}=\frac{7}{4}$
Step3: Verify similarity
All corresponding side ratios are equal ($\frac{7}{4}$), so the triangles are similar.
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(a)
$\angle P \cong \angle C$
$\angle Q \cong \angle A$
$\angle R \cong \angle B$
(b)
$\frac{AC}{PQ}=\frac{7}{4}$
$\frac{CB}{QR}=\frac{7}{4}$
$\frac{AB}{PR}=\frac{7}{4}$
(c)
$\triangle PQR$ and $\triangle ACB$ are similar.