If `R = (7 + 4 sqrt(3))^(2n) = 1 + f `, where I `in` N and
` 0 lt f lt 1 ` , then R (1 - f) equals

Let ( 5 + 2 sqrt(6))^(n) = I + f , where n, I in N and 0 lt f lt 1 , then the value of f^(2) - f + I * f - I . Is

If n is a positive integer and (3sqrt(3)+5)^(2n+1)=l+f where l is an integer annd 0 lt f lt 1 , then

Consider the binomial expansion of R = (1 + 2x )^(n) = I = f , where I is the integral part of R and f is the fractional part of R , n in N . Also , the sum of coefficient of R is 2187. If ith term is the greatest term for x= 1/3 , then i equal

Consider the binomial expansion of R = (1 + 2x )^(n) = I + f , where I is the integral part of R and f is the fractional part of R , n in N . Also , the sum of coefficient of R is 2187. The value of (n+ Rf ) "for x" = (1)/(sqrt(2)) is

Consider the binomial expansion of R = (1 + 2x )^(n) = I + f , where I is the integral part of R and f is the fractional part of R , n in N . Also , the sum of coefficient of R is 2187. If kth term is having greatest coefficient , the sum of all possible value of k, is

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

If f : R rarr R given by f(x) = x^3 + 2 , then f^-1(x) equals :

If (9 + 4 sqrt(5))^(n) = I + f , n and I being positive integers and f is a proper fraction, show that (I-1 ) f + f^(2) is an even integer.

If f: Rrarr R given by f(x) = (x^3) + 4, then f^-1(x) equals·:

Let f : R rarr R be defined by f (x) = x^2 - 3x + 4 for all x in R , then f^-1 (2) is equal to