For all `x in (0,1)`

Let f:(0,1) in (0,1) be a differenttiable function such that f(x)ne 0 for all x in (0,1) and f((1)/(2))=(sqrt(3))/(2) . Suppose for all x, lim_(x to x)(int_(0)^(1) sqrt(1(f(s))^(2))dxint_(0)^(x) sqrt(1(f(s))^(2))ds)/(f(t)-f(x))=f(x) Then, the value of f((1)/(4)) belongs to

Let f:(-1,1)rarrR be a differentiable function satisfying (f'(x))^4=16(f(x))^2 for all x in (-1,1) , f(0)=0. The number of such functions is

For all x epsilon(0,1)

Let f(x)=1/(1-x) . Then, {f\ o\ (f\ o\ f)}(x)=x for all x in R (b) x for all x in R-{1} (c) x for all x in R-{0,\ 1} (d) none of these

Let f:R-{0,1}rarr R be a function satisfying the relation f(x)+f((x-1)/(x))=x for all x in R-{0,1} . Based on this answer the following questions. f(-1) is equal to

Let f:(0,oo)rarr R be a differentiable function such that f'(x)=2-(f(x))/(x) for all x in(0,oo) and f(1)=1, then

Let f:[0,1] rarr R be such that f(xy)=f(x).f(y), for all x,y in [0,1] and f(0) ne 0. If y=y(x) satisfies the differential equation, dy/dx=f(x) with y(0)=1, then y(1/4)+y(3/4) is equql to (A) 5 (B) 3 (C) 2 (D) 4

The set of all possible real values of a such that the inequality (x-(a-1))(x-(a^(2)-1))<0 holds for all x in(-1,3) is (0,1) b.(oo,-1] c.(-oo,-1) d.(1,oo)

A function g defined for all positive real numbers,satisfies g'(x^(2))=x^(3) for all x>0 and g(1)=1 compute g(4)