In triangle RST , cos R = 3/5 . What is sin T ?

Question

asked Mar 26, 2023 128k views

1 Answer

Patrik Simek · Answer 1 · 2023-03-30T18:01:47+0000

Given:

$\cos R=(3)/(5)$

The cosine of angle R can be deffined as:

$\cos R=(adjcent)/(hypotenuse)$

Then:

adjacent leg for angle R is side RS

$\begin{gathered} (RS)/(15)=(3)/(5) \\ \\ \end{gathered}$

Use the equation above to find RS:

$\begin{gathered} RS=15*(3)/(5) \\ \\ RS=(45)/(5) \\ \\ RS=9 \end{gathered}$

Sine of angle T is:

$\sin T=(opposite)/(hypotenuse)$

Use the given data and the length of RS (opposite) to find the sinT:

$\begin{gathered} \sin T=(9)/(15) \\ \\ Simplify: \\ \sin T=(3)/(5) \end{gathered}$ Then, the sine of T is 3/5