Let ` f ` be a continuous function on `R` such that `f (1/(4n))=sin e^n/(e^(n^2))+n^2/(n^2+1)` Then the value of `f(0) ` is

Let f(n)=sum_(k=1)^(n) k^2(n C_k)^ 2 then the value of f(5) equals

Let f(x) be continuous functions f: RvecR satisfying f(0)=1a n df(2x)-f(x)=xdot Then the value of f(3) is 2 b. 3 c. 4 d. 5

Let f: RvecR be a continuous function which satisfies f(x)= int_0^xf(t)dtdot Then the value of f(1n5) is______

Let f(x)a n dg(x) be two continuous functions defined from RvecR , such that f(x_1)>f(x_2)a n dg(x_1) f(g(3alpha-4))

Let f be a continuous function satisfying f '(I n x)=[1 for 0 1 and f (0) = 0 then f(x) can be defined as

Let f:[1/2,1]->R (the set of all real numbers) be a positive, non-constant, and differentiable function such that f^(prime)(x)<2f(x)a n df(1/2)=1 . Then the value of int_(1/2)^1f(x)dx lies in the interval (a) (2e-1,2e) (b) (3-1,2e-1) (c) ((e-1)/2,e-1) (d) (0,(e-1)/2)

Let f: IvecI be a function (I is set of integers ) such that f(0)=1,f(f(n)=f(f(n+2)+2)=ndot then f(3)=0 b. f(2)=0 c. f(3)=-2 d. f is many one function

If f: RvecR be a differen tiable function atg x=0 satisfying f(0)=0a n df^(prime)(0)=1 , then the value of (lim)_(xvec0)1/xsum_(n=1)^oo(-1)^nf(x/n)= e b. -log2 c. 0 d. 1

If f and g are two functions defined on N , such that f(n)= {{:(2n-1if n is even), (2n+2 if n is odd):} and g(n)=f(n)+f(n+1) Then range of g is (A) {m in N : m= multiple of 4 } (B) { set of even natural numbers } (C) {m in N : m=4k+3,k is a natural number (D) {m in N : m= multiple of 3 or multiple of 4 }

A function f is continuous for all x (and not everywhere zero) such that f^2(x)=int_0^xf(t)(cost)/(2+sint)dtdot Then f(x) is 1/2 1n((x+cosx)/2); x!=0 1/2 1n(3/(x+cosx)); x!=0 1/2 1n((2+sinx)/2); x!=npi,n in I (cosx+sinx)/(2+sinx); x!=npi+(3pi)/4,n in I