The tatal number of solutions of `ln|sinx|=-x^2+2x in [-pi/2,(3pi)/2]` is equal to

Similar Questions

Explore conceptually related problems

The tatal number of solutions of ln|sin x|=-x^(2)+2x in[-(pi)/(2),(3 pi)/(2)] is equal to

The total number of solutions of log_(e)|sin x|=-x^(2)+2x in[0,pi] is equal to

Total number of solutions of tan x + cot x=2cosec x in [-2pi,2pi] is equal to

Number of solutions (s) of in |sin x|=-x ^(2) if x in [-(pi)/(2), (3pi)/(2)] is/are:

Number of solution of 2^(sin(|x|)) = 3^(|cos x|) in [ -pi , pi ] , is equal to

Total number of solutions of sin^(4)x+cos^(4)x=sinx*cosx in [0,2pi] is equal to

Total number of solution of 2^(cosx)=abs(sinx)"in"[ -2pi,5pi] is equal to :

Number of solutions of the equation 2tan^(2)x-5sec x=1 in (-pi,2 pi) is equal to

The number of solution of 2cosx=|sinx| where x in [0.4pi] is/are