Given that cos (x) = 1/3, find sin (90 - x)

Question

asked Jan 10, 2015 120k views

2 Answers

Malkus · Answer 1 · 2015-01-16T19:19:19+0000

Answer:

$\sin(90^(\circ) - x)=(1)/(3)$

Explanation:

Given:
$\cos (x)=(1)/(3)$

We have to find the value of
$\sin(90^(\circ) - x)$

Since Given
$\cos (x)=(1)/(3)$

Using trigonometric identity,

$\sin(90^(\circ) - \theta)=\cos\theta$

Thus, for
$\sin(90^(\circ) - x)$ comparing , we have,

$\theta=x$

We get,

$\sin(90^(\circ) - x)=\cos x=(1)/(3)$

Thus,
$\sin(90^(\circ) - x)=(1)/(3)$