The solution of `4 sin^4 x + cos^(4)x =1` is

The general solution of 4sin^(4) x + cos^(4) x=1 is

The general solution of 4sin^(4)x+cos^(4)x=1 is

One of the general solutions of 4sin^(4)x+cos^(4)x=1 is n pi+-(alpha)/(2),alpha=cos^(-1)((1)/(5)),AA n in Zn pi+-(alpha)/(2),alpha=cos^(-1)((3)/(5)),AA n in Zn pi+-(alpha)/(2),alpha=cos^(-1)((1)/(3)),AA n in Z none of these

The solution of sin^(4)x=1+cos^(6)x is x=

4sin^(4)x+cos^(4)x=1 if

The number of solutions of sin^(4)x+cos^(4)x=sin x cos x in [0,2 pi] is/are

The total number of solution of sin^(4)x+cos^(4) x= sin x cos x in [0, 2pi]

The equation sin^(4) x + cos^(4) x + sin 2x + k = 0 must have real solutions if :

Find the number of solutions of sin^(2) x cos^(2)x=1+cos^(2)x+sin^(4) x in the interval [0,pi]