QUESTION IMAGE
Question
given $\triangle abc \sim \triangle xyz$, what is the value of $\cos(z)$?
$\bigcirc \\ \frac{5}{13}$
$\bigcirc \\ \frac{5}{12}$
$\bigcirc \\ \frac{12}{13}$
$\bigcirc \\ \frac{12}{5}$
Step1: Identify corresponding angles
Since $\triangle ABC \sim \triangle XYZ$, corresponding angles are congruent: $\angle Z \cong \angle C$.
Step2: Recall cosine definition for right triangles
For $\angle C$ in right $\triangle ABC$, $\cos(\theta)=\frac{\text{adjacent side}}{\text{hypotenuse}}$.
Step3: Match sides for $\angle C$
Adjacent side to $\angle C$ is $12$, hypotenuse is $13$.
<Expression>
$\cos(C)=\frac{12}{13}$
</Expression>
Step4: Equate to $\cos(Z)$
Since $\angle Z \cong \angle C$, $\cos(Z)=\cos(C)$.
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$\boldsymbol{\frac{12}{13}}$ (Option C)