the equation `e^(sinx)-e^(-sinx)-4=0` has.

The equation e^(sin x)-e^(-sin x)-4=0 has

Find the number of solution of the equation e^(sinx)-e^(-sinx)-4=0

The least value of 'a' for which the equation 4/(sinx)+1/(1-sinx)=a has at least one solution in the interval (0,pi//2) , is

The least value of a for which the equation 4/(sinx)+1/(1-sinx)=a has at least one solution in the interval (0,pi/2) (a) 9 (b) 4 (c) 8 (d) 1

Between any two real roots of the equation e^(x)sinx-1=0 the equation e^(x)cosx+1=0 has

If both the distinct roots of the equation |sinx|^2+|sinx|+b=0in[0,pi] are real, then the values of b are [-2,0] (b) (-2,0) [-2,0] (d) non eoft h e s e

If both the distinct roots of the equation |sinx|^2+|sinx|+b=0in[0,pi] are real, then the values of b are [-2,0] (b) (-2,0) [-2,0] (d) non eoft h e s e

The number of distinct real roots of the equation |{:(cosx, sinx, sinx), (sinx, cosx, sinx), (sinx, sinx, cosx):}|=0 in the interval [-\ pi/4,pi/4] is- a. 3 b. \ 4 c. \ 2 d. 1

The number of solutions of the equation e^(|sinx|)=sec x for all x in (-pi//2,pi//2) is/are

Integrate the functions e^(2x)sinx