`f(x)= int(dx)/(sin^6 x)` is a polynomial of degree

f(x) is a polynomial of degree

f(x) = int (dx)/(sin^(4)x) is a

int(dx)/(1+sin6x)dx=

If f(x), g(x), h(x) are polynomials of three degree, then phi(x)=|(f'(x),g'(x),h'(x)), (f''(x),g''(x),h''(x)), (f'''(x),g'''(x),h'''(x))| is a polynomial of degree (where f^n (x) represents nth derivative of f(x))

If f(x), g(x), h(x) are polynomials of three degree, then phi(x)=|(f'(x),g'(x),h'(x)), (f''(x),g''(x),h''(x)), (f'''(x),g'''(x),h'''(x))| is a polynomial of degree (where f^n (x) represents nth derivative of f(x))

Let f:R rarr R be a function as f(x)=(x-1)(x+2)(x-3)(x-6)-100 . If g(x) is a polynomial of degree le 3 such that int (g(x))/(f(x))dx does not contain any logarithm function and g(-2)=10 . Then

I=int(cosx)/(sin^(6)x)dx

Let f(x) be the polynomial of degree n, then Delta^(n-1) f(x) is a polynomial of degree.

If int(tan^(9)x)dx=f(x)+log|cosx|, where f(x) is a polynomial of degree n in tan x, then the value of n is

If int(tan^(9)x)dx=f(x)+log|cosx|, where f(x) is a polynomial of degree n in tan x, then the value of n is