Answer to Question #157034 in Trigonometry for Kinza Tahir

Question #157034

Determine the value of sin2x given that tan^2x=81/49 and Pi<x<3pi/2

Expert's answer

"tan\u00b2x = \\frac{81}{49}"

=> "tan x = \\frac{9}{7}"

"x = tan^{-1} (\\frac{9}{7})\nx = 52.1250^{0}"

Since tan is positive in both 1st and 3rd quadrant, that implies

In 1st quadrant

x = 52.1250°

In the 3rd quadrant

x = 180 + 52.1250° = 232.1250°

But "\u03c0<x<\\frac{3\u03c0}{2}"

Therefore, x = 232.1250°

"Sin 2x = Sin 2(232.1250) = 0.9692"

Learn more about our help with Assignments: Trigonometry

No comments. Be the first!