Rewrite sec(x) sec ( x) in terms of sines and cosines Rewrite tan(x) tan ( x) in terms of sines and cosines Multiply by the reciprocal of the fraction to divide by 1 cos(x) 1 cos ( x) Write cos(x) cos ( x) as a fraction with denominator 1 1 Cancel the common factor of cos(x) cos ( x)Integral of sec^2 (x) \square!Tan^2 x1=sec^2x So to get 1 on the other side of the equal sign wouldn't it be sec^2xtan^2x=1?
Solution Verify The Identity By Showing That The Left Equals Right Sec 2x 1 Tan 2 Sec2x Do I Use 1 Cos 2x 1 Tan 2x Or Do I Use 1 Tan 2x 1 Tan 2x Either Way I Do Not Know Where To Go Fro
