If `sin^(2) x - 2 sin x - 1 = 0 ` has exactly four different solutions in `x in [0, n pi]` , then value/ values of n is / are `(n in Z)`

e^(|sin x|)+ e^(-|sin x|) + 4 a = 0 will have exactly four different solutions in [0, 2 pi] is

If the equation x^(2) + 12 + 3 sin (a + bx) + 6x = 0 has at least one real solution, when a, b in [0, 2 pi] , then the value of a = 3b is (n in Z)

If 2tan^(2)x-5secx=1 for exactly 7 distinct values of x in [0,(npi)/2], n in N then greatest value of n is

If sin^(2)x - cos x = 1//4 then the values of x in (0, 2pi) are

For m=n and m, n in N then the value of int_(0)^(pi) cos m x cos n x dx =

Find the value of int_(0)^(pi) (x)/(1+sin x) dx

For m, n in N and m != n then the value of int_(0)^(pi) sin m x " " sin n x " " dx=

If f(x) = 2sin^(3) x + lambda sin^(2) x, x - (pi)/(2) lt x lt (pi)/(2) has exactly one maximum and one minimum, then find set of values of lambda .