If csc x=-2 and cos x is greater than 0, find cos x/2?

1 Answer
Nghi N.
Sep 18, 2015

Find #cos (x/2)#

Ans: #sqrt(2 + sqrt3)/2#

Explanation:

sin x = 1/csc x = -1/2 --> #x = ((7pi)/6)# and #x = ((11pi)/6)#.
Since cos x > 0, x should be in the Quadrant IV, and only the second number is accepted:
#x = ((11pi)/6)# --> #sin x = - 1/2# --> #cos x = sqrt3/2# (Trig Table)
Apply the trig identity: #cos 2a = 2cos^2 a - 1#
#cos x = sqrt3/2 = 2cos^2 (x/2) - 1#
#2cos^2 (x/2) = 1 + sqrt3/2 = (2 + sqrt3)/2#
#cos^2 (x/2) = (2 + sqrt3)/4#
#cos (x/2) = +- sqrt(2 + sqrt3)/2#
Since cos x > 0, then only the positive answer is accepted
#cos (x/2) = sqrt(2 + sqrt3)/2#
Check by calculator.
cos ((11pi)/6) = cos 330 = 0.83
sqrt(2 + sqrt3)/2 = 1.65/2 = 0.83. OK

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