Given an even function f defined and integrable everywhere and periodic with period 2.Let `g(x)=int_0^x f(t) dt and g(1)=A.`

Given an even function f defined and integrable everywhere and periodic with period 2 . Let g(x)=int_0^x f(t) dt and g(t)=k for what values of g in terms of k

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k For what value of g in terms of k is

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k The value of g(x+2)-g(x) is equal to (A) g(1) (B) 0 (C) g(2) (D) g(3)

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k The value of g(x+2)-g(x) is equal to (A) g(1) (B) 0 (C) g(2) (D) g(3)

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k The value of g(2) in terms of k is equal to (A) k (B) 2k (C) 3k (D) 5k

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k The value of g(2) in terms of k is equal to (A) k (B) 2k (C) 3k (D) 5k

Let f be an odd continous function which is periodic with priod 2 if g(x) = int_0^x f(t) dt then

Let f(x) be an odd continuous function which is periodic with period 2. if g(x)=int_(0)^(x) f(t)dt , then

Given f an odd function periodic with period 2 continuous AA x in R and g(x)=int_0^x f(t)dt then (i) g(x) is an odd function (ii) g(x+2)=1 (iii) g(2)=0 (iv) g(x) is an even function