[" For "x in R,x!=0,x!=1," let "f_(0)(x)=(1)/(1-x)" and "f_(n+)],[(x)=f_(0)(f_(n)(x)),n=0,1,2,..." Then the "f_(100)(3)+f],[((2)/(3))+f_(2)((3)/(2))" is equal to "]

For x in R , x ne0, 1, let f_(0)(x)=(1)/(1-x) and f_(n+1)(x)=f_(0)(f_(n)(x)),n=0,1,2….. Then the value of f_(100)(3)+f_(1)((2)/(3))+f_(2)((3)/(2)) is equal to

For x in R , x ne0, 1, let f_(0)(x)=(1)/(1-x) and f_(n+1)(x)=f_(0)(f_(n)(x)),n=0,1,2….. Then the value of f_(100)(3)+f_(1)((2)/(3))+f_(2)((3)/(2)) is equal to

For x in R, x != 0, x != 1 , let f_(0)(x)= (1)/(1-x) and f_(n+1)(x)=f_(0)(f_(n)(x)), n = 0, 1, 2,.... Then the value of f_(100)(3)+f_(1)(2/3)+f_(2)(3/2) is equal to

For x varepsilon R,x!=0,x!=1, Let f_(0)(x)=(1)/(1-x) and f_(n+1)(x)=f_(0)(f_(n)(x)),n=0,1,2,3...... Then the value of f_(100)(3)+f_(1)((2)/(3))+f_(2)((3)/(2)) is equal to:

If f(x) = (1 - x)^n then the value of f(0) + f'(0) + (f^('')(0))/(2!) + ….+ (f^('')(0))/(n!) is equal to

For x in R-{0,1}, " let " f_(1)(x)=(1)/(x), f_(2)(x)=1-x and f_(3)(x)=(1)/(1-x) be three given functions. If a function, J(x) satisfies (f_(2) @J@f_(1))(x)=f_(3)(x), " then " J(x) is equal to

For x in R-{0,1}, " let " f_(1)(x)=(1)/(x), f_(2)(x)=1-x and f_(3)(x)=(1)/(1-x) be three given functions. If a function, J(x) satisfies (f_(2) @J@f_(1))(x)=f_(3)(x), " then " J(x) is equal to

For x in R-{0,1}, let f_(1)(x)=(1)/(x),f_(2)(x)=1-x and f_(3)(x)=(1)/(1-x) be three given functions.If a function,J(x) satisfies (f_(2)oJof_(1))(x)=f_(3)(x) then J(x) is equal to

Let f(x)=int(1)/((1+x^(2))^(3//2))dx and f(0)=0 then f(1)=