`Iff(pi)=2int_0^pi(f(x)+f^(x))sinxdx=5,t h e nf(0)` is equal to (it is given that `f(x)` is continuous in `[0,pi])dot` 7 (b) 3 (c) 5 (d) 1

If f(pi) = 2 int_0^pi (f(x)+f^(x)) sinx dx=5 , then f(0) is equal to (it is given that f(x) is continuous in [0,pi]) . (a) 7 (b) 3 (c) 5 (d) 1

If f(pi)=2 and int_(0)^(pi)(f(x)+f''(x))sinx dx=5 then f(0) is equal to, (it is given that f(x) is continuous in [0,pi] )

If f(pi) = 2 and int_0^pi (f(x)+f^('')(x)) sinx dx=5 , then f(0) is equal to (it is given that f(x) is continuous in [0,pi]) . (a) 7 (b) 3 (c) 5 (d) 1

If f(pi)=2 and int_(0)^(pi)(f(x)+f''(x))sin x dx=5 , then f(0) is equal to ( it is given that f(x) is continuous in [0,pi] )

If f(pi)=2 and int_(0)^(pi)(f(x)+f''(x))sin x dx=5 , then f(0) is equal to ( it is given that f(x) is continuous in [0,pi] )

If f(pi)=2 and int_(0)^( pi)(f(x)+f'(x))sin xdx=5 then f(0) is equal to

If f(pi) = 2 and int_0^(pi) [f(x)+f^('')(x)] sin x dx = 5 then f(0)

If int_(0)^( pi)f(x)dx=pi+int_(pi)^(1)f(t)dx, then the value of (L) is :

If f(x)=cosx-int_0^x(x-t)f(t)dt ,t h e nf^(primeprime)(x)+f(x) is equal to (a) -cosx (b) -sinx (c) int_0^x(x-t)f(t)dt (d) 0