Simetria Função

par: f(−x)=f(x); ímpar: f(−x)=−f(x).

Created by: Renato Passos, Eng. de Software
Reviewed by: Renato Passos, Eng. de Software

Last updated: Apr 18, 2026

f(x)

f(−x)

Simetria

Ímpar

Formula

paridade

About this calculator

The symmetry of a function is a fundamental property in function analysis. It helps us understand how the function behaves at different points and intervals. The parity of a function is determined by how it behaves in relation to the x-axis.

There are two main types of symmetry: even and odd. An even function satisfies the condition f(-x) = f(x), while an odd function satisfies the condition f(-x) = -f(x). These conditions are essential to determine the symmetry of a function.

Symmetry is crucial in many areas of mathematics, including function analysis, geometry, and physics. It helps us understand how functions behave in different situations and predict how they will behave in different conditions.

Frequently asked questions

What is parity in functions?

Parity in functions is a property that determines how the function behaves in relation to the x-axis. There are two main types of parity: even and odd.

How do I determine the parity of a function?

To determine the parity of a function, you need to test if f(-x) = f(x) (even) or f(-x) = -f(x) (odd).

What is the importance of symmetry in functions?

Symmetry in functions is fundamental to understand how they behave in different situations and predict how they will behave in different conditions.

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