Converting Parametric Equations to Rectangular Form

To eliminate the parameter and express the equation in terms of X and Y.

To introduce a new parameter for simplification.

To convert the equation into a quadratic form.

To express the equation in terms of polar coordinates.

Solve the Y equation for the parameter.

Solve the X equation for the parameter.

Directly substitute the parameter into the Y equation.

Find the domain restrictions first.

To convert the equation into a linear form.

To simplify the equation further.

To avoid undefined expressions like division by zero or square roots of negative numbers.

To ensure the equation is in polar form.

y = 4t + 5

y = ±4√(x + 5)

y = x^2 - 5

y = 4x + 5

x must be less than or equal to 5

x must be greater than 5

x must be greater than or equal to -5

x must be less than -5

Alpha

Beta

Theta

Gamma

The angle subtraction identity

The sum-to-product identity

The double angle identity

The Pythagorean identity

y^2/4 + x^2/4 = 1

y^2/16 + x^2/2 = 1

y^2/16 + x^2/4 = 1

y^2/4 + x^2/2 = 1

A hyperbola

An ellipse

A circle

A parabola