How do I find the value of sin 11pi / 6?

1 Answer
Nghi N.
Aug 14, 2015

Find #sin ((11pi)/6)#

Ans: #(-1/2)#

Explanation:

Call #sin ((11pi)/6) = sin t#
#cos 2t = cos ((22pi)/6) = cos ((-2pi)/6 + 12(2pi))#=
#= cos ((-2pi)/6) = cos ((pi)/3) = 1/2#
Use trig identity: #cos 2t = 1 - 2sin^2 t = 1/2#
#2sin^2 t = 1 - 1/2 = 1/2#
#sin^2 t = 1/4#
#sin ((11pi)/6) = sin t = +- 1/2#
Since the arc (11pi)/6) is located in Quadrant IV, only the negative #(-1/2) # answer is accepted.

NOTE. One better way is using the trig unit circle to directly find the answer --># sin ((11pi)/6) = - sin pi/6 = -1/2#, because the question doesn't mandate using the half angles trig identity

Related questions
See all questions in Trigonometric Functions of Any Angle
Impact of this question
80027 views around the world
You can reuse this answer
Creative Commons License