How do you find the value for sin2theta, cos2theta, and tan2theta and the quadrant in which 2theta lies given sintheta=-sqrt10/10 and theta is in quadrant IV?

1 Answer
Nghi N
May 28, 2017

1t is in Quadrant 4.
sin 2t = - 3/5
cos 2t = 4/5
tan 2t = - 3/4

Explanation:

sin t = - 1/sqrt10. Find cos t
cos^2 t = 1 - sin^2 t = 1 - 1/10 = 9/10
cos t = 3/sqrt10 --> because t is in Quadrant 4
sin 2t = 2sin t.cos t = 2(-1/sqrt10)(3/sqrt10) = - 6/10= - 3/5
Find cos 2t.
cos 2t = 2cos^2 t - 1 = 18/10 - 1 = 8/10 = 4/5
2t is in Quadrant 4 because its sin is negative and its cos is positive.
tan 2t = (sin 2t)/(cos 2t) = (-3/5)(5/4) = - 3/4

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