Verify the identity: cos(x+π/2)= -sinx

Question

asked Jun 28, 2017 64.2k views

1 Answer

Luis Ascorbe · Answer 1 · 2017-07-03T20:14:20+0000

Answer:

This result can be verified using a trigonometric identity.

Explanation:

We use the the trigonometric identity

$cos(a\:{\pm}\:b)=cos(a)*cos(b){\mp}sin(a)*sin(b).$

In our case
a=x and
$b=\pi /2$ , thus:

$cos(x+(\pi)/(2) )=cos(x)*cos((\pi)/(2))-sin(x)*sin((\pi)/(2)).$

Since

$cos((\pi)/(2))=0$ and

$sin((\pi)/(2))=1$

the above equation simplifies as

$cos(x+(\pi)/(2) )=cos(x)*cos((\pi)/(2))-sin(x)*sin((\pi)/(2))=-sin(x)$

$\boxed{cos(x+(\pi)/(2) )=-sin(x)}$

thus proving the identity.