If a real valued function `f(x)` satisfies the equation `f(x +y)=f(x)+f (y)` for all `x,y in R` then `f(x)` isA. a periodic functionB. an even functionC. an odd functionD. none of these

If a real valued function `f(x)` satisfies the equation `f(x +y)=f(x)+

1.	If a real valued function `f(x)` satisfies the equation `f(x +y)=f(x)+f (y)` for all `x,y in R` then `f(x)` isA. a periodic functionB. an even functionC. an odd functionD. none of these
Answer» Correct Answer - C We know that the function f(x) satisfying the property `f(x+y)=f(x)+f(y)` for all ` x, y in R` has the formula `f(x)=xf(1)` for all ` x in R`. Clearly , it is an odd function.

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