Let a function f be even and integrable ...

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)`

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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)`

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