How to find the exact value of csc ((5pi)/6) using the half angle formula?

elynnea4xl

elynnea4xl

Answered question

2023-02-17

How to find the exact value of csc ( 5 π 6 ) using the half angle formula?

Answer & Explanation

buenasvistasm9xy

buenasvistasm9xy

Beginner2023-02-18Added 7 answers

Half-angle formula for sin is : sin ( θ 2 ) = ± 1 - cos θ 2 , where sign is to be taken properly.
Putting, θ = 5 π 3 , we get,
sin { 5 π 3 2 } = sin ( 5 π 6 ) = ± 1 - cos 5 π 3 2
Since, sin ( 5 π 6 ) = sin ( π - π 6 ) , 5 π 6 lies in the I I n d Quadrant, + v e sign has to be taken
But, cos 5 π 3 = cos ( 2 π - π 3 ) = cos ( π 3 ) = 1 2 .
sin 5 π 6 = 1 - 1 2 2 = 1 4 = 1 2 .
Therefore, csc ( 5 π 6 ) = 1 sin ( 5 π 6 ) = 2 .
Admiddevadxvi

Admiddevadxvi

Beginner2023-02-19Added 1 answers

We can assess csc ((5pi)/6) without using half angle formula.
csc ( 5 π 6 ) = 1 sin ( 5 π 6 ) .
Find sin ( 5 π 5 ) .
Trig table, and unit circle -->
sin ( 5 π 6 ) = sin ( - π 6 + 6 π 6 ) = sin ( - π 6 + π ) =
= sin ( π 6 ) = 1 2
Hence,
csc ( 5 π 6 ) = 1 sin = 2

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