ExamPlay Dark Logo
Logga in

JEE Advance - Mathematics (1983 - No. 50)

The derivative of an even function is always an odd function.
TRUE
FALSE

Förklaring

The statement "The derivative of an even function is always an odd function" is Option A: TRUE.

To understand why this is true, let's first define even and odd functions:

An even function is a function $ f(x) $ that satisfies the condition:

$$ f(-x) = f(x) $$

An odd function is a function $ g(x) $ that satisfies the condition:

$$ g(-x) = -g(x) $$

Now, let's consider the derivative of an even function. Let $ f(x) $ be an even function, meaning:

$$ f(-x) = f(x) $$

We want to find the derivative $ f'(x) $ and determine if it is odd. Using the definition of the derivative, we have:

$$ f'(x) = \lim_{{h \to 0}} \frac{f(x+h) - f(x)}{h} $$

Since $ f(x) $ is even, we have:

$$ f(x) = f(-x) $$

Taking the derivative of both sides with respect to $ x $, we get:

$$ f'(-x) \cdot (-1) = f'(x) $$

or

$$ f'(-x) = -f'(x) $$

This shows that the derivative $ f'(x) $ satisfies the condition for being an odd function. Therefore, the derivative of an even function is indeed always an odd function.

Kommentarer (0)

Logga in för att kommentera
Annons
BrainBehindX Inc Logo
©2026; Drivs av BrainBehindX Inc