If `f(x) =int x^(m-1)dx` then `f^(m-1) x=0` where a) m is a negative integer (b) m=0 c) m is not an integer (d) m is a positive integer

If f(x)=root(n)(x^(m)),n in N, is an even function, then m is even integer (b) odd integer any integer (d)f(x)- even is not possible

Let f(x)=x^(m/n) for x in R where m and n are integers , m even and n odd and 0

If f(x)= (x^m)^(1/n) ,n in N , is an even function, then m is (a)even integer (b) odd integer (c) any integer (d) f(x)-e v e ni s not pos s i b l e

If f(x)= (x^m)^(1/n) ,n in N , is an even function, then m is (a)even integer (b) odd integer (c) any integer (d) f(x)-e v e ni s not pos s i b l e

State True or False : x^(m)+x^(m)=x^(2m) , where x is a non zero rational number and m is a positive integer.

x^(m)-:y^(m)=(x-:y)^(m) , where x and y are non zero rational numbers and m is a positive integer.

n|sin x|=m|cos|in[0,2 pi] where n>m and are positive integers

If x be any integer different from zero and m be any positive integer. x^(-m) is equal to

If (x-a)^(2m)(x-b)^(2n+1), where m and n are positive integers and a>b, is the derivative of a function f then-

Let f(x)=x^((m)/(n)) for x in R where m and n are integers,m even and n odd and '0