What are the coordinates ofthe terminal point determined by t= 11(pi)/3

Question

asked Aug 21, 2023 91.9k views

1 Answer

Dajon · Answer 1 · 2023-08-26T14:48:13+0000

SOLUTION

The equation given is

$t=(11\pi)/(3)$

By the definitions of trigonometry functions, the point t has as coordinates

Where

$\begin{gathered} x=\cos \theta \\ y=\sin \theta \\ \text{and } \\ \theta=(11\pi)/(3) \end{gathered}$

The next step is to convert the angle to degree

$(11\pi)/(3)=(11*180)/(3)=660^0$

Then we have

$\begin{gathered} x=\cos 660^0\text{=}(1)/(2) \\ y=\sin 660^0=-\frac{\sqrt[]{3}}{2} \end{gathered}$

Hence the terminal point becomes

$(x,y)=((1)/(2),-\frac{\sqrt[]{3}}{2})$

Therefore the right option is C