Consider the cubic equation `f(x)=x^(3)-nx+1=0` where `n ge3, n in N` then `f(x)=0` has

If f(x)=(a-x^(n))^(1//n),"where a "gt 0" and "n in N , then fof (x) is equal to

If (1+alpha)/(1-alpha),(1+beta)/(1-beta), (1+gamma)/(1-gamma) are the cubic equation f(x) = 0 where alpha,beta,gamma are the roots of the cubic equation 3x^3 - 2x + 5 =0 , then the number of negative real roots of the equation f(x) = 0 is :

If (1+alpha)/(1-alpha),(1+beta)/(1-beta), (1+gamma)/(1-gamma) are the cubic equation f(x) = 0 where alpha,beta,gamma are the roots of the cubic equation 3x^3 - 2x + 5 =0 , then the number of negative real roots of the equation f(x) = 0 is :

A function f:R to R is differernitable and satisfies the equation f((1)/(n)) =0 for all integers n ge 1 , then

Let f(x) =x^(n+1)+ax^n, "where " a gt 0 . Then, x=0 is point of

The probability that the roots of the equation x^(2)+nx+(1)/(2)+(n)/(2)=0 are real where n in N such that n le 5 , is

Consider the function f defined by f(x)={[0,x=0 or x is irrational],[ 1/n, where x is a non – zero rational number m/n, n gt 0 and m/n is in lowest term]} which of the following statements is true?

Consider the function f defined on the set of all non-negative interger such that f(0) = 1, f(1) =0 and f(n) + f(n-1) = nf(n-1)+(n-1) f(n-2) for n ge 2 , then f(5) is equal to

If a_(0)=x,a_(n+1)=f(a_(n)), " where " n=0,1,2, …, then answer the following questions. If f(x)=(1)/(1-x), then which of the following is not true?

f:N to N, where f(x)=x-(-1)^(x) , Then f is