Parametric Equations: Week #1

They allow tracing the movement of an object along a path according to time.

They simplify algebraic expressions.

They reduce computational errors.

They eliminate the need for graphing.

x(t) = e^t, y(t) = e^-t

x(t) = t + 1, y(t) = t - 1

x(t) = t^2, y(t) = t^2 - 1

x(t) = r cos(t), y(t) = r sin(t)

Calculating the area under a curve.

Finding the maximum value of a function.

Translating a single equation into an equivalent pair of equations in three variables.

Solving a system of linear equations.

x = (y - 2)^2 + 1

x = y^2 - 4y + 5

x = y^2 + 2y + 3

x = (y + 2)^2 - 1

Applying differential equations

Applying calculus integration techniques

Using matrix operations

Using trigonometric identities and the Pythagorean Theorem

y = x^3

y = 3x

y = x/3

y = 3/x

They require less computational power.

They provide detailed information about direction and motion over time.

They simplify complex algebraic equations.

They are easier to solve than Cartesian equations.

(x/4)^2 + (y/3)^2 = 1

x^2 + y^2 = 1

(x/3)^2 + (y/4)^2 = 1

x^2 + y^2 = 25

Time

Temperature

Torque

Tension

x(t) = t - 3, y(t) = t^2

x(t) = t + 3, y(t) = t^2

x(t) = t^2, y(t) = t - 3

x(t) = t, y(t) = t^2 - 3