Let `F(x)=int_(x)^(x^2+pi/2) 2 cos^(2)dt` for all `x in R` and `f:[0,1/2] to (0,oo)` be a continuous function. For `a in[0,1/2]`, if `F'(a)+2` is the area of the region bounded by x=0,y=0,y=f(x) and x=a, then f(0) is

Let f:[-1,2]->[0,oo) be a continuous function such that f(x)=f(1-x)fora l lx in [-1,2]dot Let R_1=int_(-1)^2xf(x)dx , and R_2 be the area of the region bounded by y=f(x),x=-1,x=2, and the x- axis . Then R_1=2R_2 (b) R_1=3R_2 (c) 2R_1=R_2 (d) 3R_1=R_2

Let f(x)=int_(0)^(x)"cos" ((t^(2)+2t+1)/(5))dt,0>x>2, then

If f(x) is continuous function in [0,2pi] and f(0)=f(2 pi ), then prove that there exists a point c in (0,pi) such that f(x)=f(x+pi).

Let f(x) = (x+|x|)/x for x ne 0 and let f (0) = 0, Is f continuous at 0?

Let f:R rarr R be a continuous function such that f(x)-2f(x/2)+f(x/4)=x^(2) . f'(0) is equal to

Let f(x)=1/2[f(xy)+f(x/y)] " for " x,y in R^(+) such that f(1)=0,f'(1)=2. f(e) is equal to

Let f(x) be a continuous function for all x , which is not identically zero such that {f(x)}^2=int_0^x\ f(t)\ (2sec^2t)/(4+tant)\ dt and f(0)=ln4, then

Let f(x) = |x| cos (1/x) for x ne 0 . Write the down the value of (f) (0) if f is continuous at x = 0

Let f: R rarr R be a continuous function given by f(x+y)=f(x)+f(y) for all x,y, in R, if int_0^2 f(x)dx=alpha, then int_-2^2 f(x) dx is equal to

If f and g are continuous functions on [0,a] satisfying f(x)=(a-x) and g(x)+g(a-x)=2 , then show that int_(0)^(a)f(x)g(x)dx=int_(0)^(a)f(x)dx .