If sin(θ -π/2) = 0.73.. find cos (-θ) plz explain how to solve

Question

asked Jan 26, 2021 42.7k views

1 Answer

Jirilmon · Answer 1 · 2021-01-31T02:25:19+0000

Answer:

$cos(-\theta) = -0.73$

Explanation:

It is given that:

$sin(\theta -(\pi)/(2)) = 0.73$

Formula to be used:

$1.\ sin(-x) = -sinx\\2.\ sin((\pi)/(2)-x) = cosx\\3.\ cos(-x) = cosx$

Using Formula (1) written above:

$\Rightarrow sin (\theta - (\pi)/(2))=sin(-((\pi)/(2)-\theta ))\\\Rightarrow -sin((\pi)/(2)-\theta)$

Now, using Formula (2) written above:

$\Rightarrow -sin((\pi)/(2)-\theta) = -cos \theta$

So, we can say that:

$sin(\theta -(\pi)/(2)) = -cos\theta = 0.73 ...... (1)$

We have to find the value of
$cos(-\theta)$ .

Using Formula (3) written above:

$cos(-\theta) = cos\theta$

So, ultimately we need to find the value of
$cos\theta$

Using equation (1):

$-cos\theta = 0.73\\\Rightarrow cos\theta = -0.73$

So, the answer is
$cos(-\theta) = -0.73$ .