1 Answer

Ariel Weinberger · Answer 1 · 2021-10-28T14:51:57+0000

Answer:

We get the value of
Sin B=0.45 in radians which is equal to
$0.15\pi$

Explanation:

Given that,

Sin B=0.45

To find:- find angle B in Radians.

So,

To find the Angle B needs to take
Sin^(-1) . Sin has a range
[-1,1] for all
$\theta$ ∈
.

Sin B=0.45

B=Sin^(-1) (0.45)

B=26.74

Thus angle
B=26.74 is in degree.

Here, converting the degree into radian we find,

$Radian = degree * (\pi)/(180)$

⇒
$B= 26.74 * (\pi)/(180)\ Rad$

⇒
$B = 0.15\pi\ Rad$

Therefore,

We get the value of
Sin B=0.45 in radians which is equal to
$0.15\pi$ .

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