consider △rst and △ryx. if the triangles are similar, which must be true? o $\frac{ry}{ys}=\frac{rx}{xt}=\fra…

consider △rst and △ryx. if the triangles are similar, which must be true? o $\frac{ry}{ys}=\frac{rx}{xt}=\frac{xy}{ts}$ o $\frac{ry}{rs}=\frac{rx}{rt}=\frac{xy}{ts}$ o $\frac{ry}{rs}=\frac{rx}{rt}=\frac{rs}{ry}$ o $\frac{ry}{rx}=\frac{rs}{rt}=\frac{xy}{ts}$

consider △rst and △ryx. if the triangles are similar, which must be true? o $\frac{ry}{ys}=\frac{rx}{xt}=\frac{xy}{ts}$ o $\frac{ry}{rs}=\frac{rx}{rt}=\frac{xy}{ts}$ o $\frac{ry}{rs}=\frac{rx}{rt}=\frac{rs}{ry}$ o $\frac{ry}{rx}=\frac{rs}{rt}=\frac{xy}{ts}$

Answer

Answer:

$\frac{RY}{RS}=\frac{RX}{RT}=\frac{XY}{TS}$

Explanation:

Step1: Definición de triángulos semejantes

Si $\triangle{RST}\sim\triangle{RYX}$, entonces las razones de los lados correspondientes son iguales.

Step2: Identificar lados correspondientes

Los lados correspondientes son: $RY$ y $RS$, $RX$ y $RT$, $XY$ y $TS$.

Step3: Escribir proporciones

Las proporciones correctas son $\frac{RY}{RS}=\frac{RX}{RT}=\frac{XY}{TS}$.