Symmetry in Odd and Even Functions

They help in understanding the periodicity of trig functions.

They determine the frequency of trig functions.

They describe the symmetry properties of trig functions.

They are used to calculate the amplitude of trig functions.

A function that has no symmetry.

A function that is symmetrical about the origin.

A function that is symmetrical about the y-axis.

A function that is symmetrical about the x-axis.

f(x) = f(-x)

f(x) = -f(-x)

f(x) = 2f(-x)

f(x) = 0

Rotational symmetry about the origin

Reflectional symmetry about the x-axis

No symmetry

Reflectional symmetry about the y-axis

f(x) = f(-x)

f(x) = -f(-x)

f(x) = 2f(-x)

f(x) = 0

They have odd powers.

They have even powers.

They have no powers.

They have fractional powers.

They are symmetrical about the origin.

They are symmetrical about the x-axis.

They are symmetrical about the y-axis.

They have no symmetry.

y = x⁴

y = x³

y = x²

y = x⁶

The symmetry becomes more pronounced.

The symmetry remains the same.

The symmetry disappears.

The symmetry becomes less pronounced.

They exhibit rotational symmetry about the origin.

They exhibit reflectional symmetry about the y-axis.

They exhibit no symmetry.

They exhibit reflectional symmetry about the x-axis.