If sina =-5÷13 and a lies in quadrant 3 then the value of cos (a÷2)?

1 Answer
Nghi N
May 4, 2018

cos (a/2) = - sqrt26/26

Explanation:

sin a = - 5/13.
First find cos a.
cos^2 a = 1 - sin^2 a = 1 - 25/169 = 144/169
cos a = +- 12/13.
Since a lies in Quadrant 3, cos a is negative.
cos a = - 12/13.
To find cos (a/2), use trig identity:
2cos^2 (a/2) = 1 + cos a
2cos^2 (a/2) = 1 - 12/13 = 1/13
cos^2 (a/2) = 1/26
cos (a/2) = +- 1/sqrt26.
Since a lies in Quadrant 3, then, a/2 lies in Quadrant 2, and
cos (a/2) is negative.
cos (a/2) = - 1/sqrt26 = sqrt26/26

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