If `sin^(-1)(e^x)+cos^(-1)(x^2)=pi/2`, then find the number of solutions of this equation

x_(1) and x_(2) are two solutions of the equation e^(x) cos x=1 , The minimum number of the solution of the equation e^(x) sin x =1 , lying between x_(1) and x_(2) can be

x_(1) and x_(2) are two solutions of the equation e^(x) cos x=1 , The minimum number of the solution of the equation e^(x) sin x =1 , lying between x_(1) and x_(2) can be

x_(1) and x_(2) are two solutions of the equation e^(x) cos x=1 , The minimum number of the solution of the equation e^(x) sin x =1 , lying between x_(1) and x_(2) can be

x_(1) and x_(2) are two solutions of the equation e^(x) cos x=1 , The minimum number of the solution of the equation e^(x) sin x =1 , lying between x_(1) and x_(2) can be

Let alpha is the solution of equation sin^(-1)(2sin^(-1)(cos^(-1)(tan^(-1)x)))=0 and beta is the solution of equation sin^(-1)x+sin^(-1)x^(2)=(pi)/(2), then -

Number of solutions of the equation cos ec^(-1)(cos ecx)=sin x. in [-2 pi,2 pi] is 'a' and number of solutions of cos ec^(-1)(cos ecx)=sqrt(sin x) in this interval is 'b' then sqrt(a+b) is

Find the number of solutions of the equation 2cos3x(3-4sin^(2)x)=1 in [0,2 pi]

Find the number of solution of the equations 2^(cos x)=|sin x|, when x in[-2pi,2pi]

Find the number of solution of the equations 2^(cos x)=|sin x|, when x in[-2pi,2pi]

Find the number of solution of the equations 2^(cos x)=|sin x|, when x in[-2pi,2pi]