Quadratic identity

Logarithmic identity

Pythagorean identity

Exponential identity

x/5 = sin(θ) and y/7 = cos(θ)

x/5 = sec(θ) and y/7 = csc(θ)

x/5 = cos(θ) and y/7 = sin(θ)

x/5 = tan(θ) and y/7 = cot(θ)

x = 5sin(t), y = 7cos(t)

x = 5sec(t), y = 7csc(t)

x = 5cos(t), y = 7sin(t)

x = 5tan(t), y = 7cot(t)

Counterclockwise

Clockwise

Horizontal

Vertical

It becomes vertical

It becomes counterclockwise

It becomes clockwise

It remains the same

They eliminate the need for trigonometric functions.

They provide a static representation of curves.

They simplify complex equations.

They allow for animation or movement representation over time.

They are only used for circles.

They cannot represent ellipses.

They can represent the same curve with different orientations.

They are unique for every curve.

It shows the orientation of the curve.

It becomes a straight line.

It provides an animated representation.

It shows the graph without orientation.

To make the graph linear

To simplify calculations

To represent curves with orientation and motion

To avoid using trigonometric functions

Different curves are formed

The same curve is formed with different orientations

The curve disappears

The curve becomes a circle