To learn about the applications of conic sections in real life

To memorize the equations of conic sections

To determine the type and graph conic sections in polar form

To understand the history of conic sections

Hyperbola

Circle

Ellipse

Parabola

The directrix is circular

The directrix is diagonal

The directrix is horizontal

The directrix is vertical

Along the x-axis

Along the z-axis

Along the polar axis

Along the y-axis

The directrix is horizontal

The directrix is diagonal

The directrix is vertical

The directrix is circular

Along the x-axis

Along the polar axis

Along the z-axis

Along the y-axis

Multiply the numerator by two

Divide the entire equation by the coefficient of the denominator

Subtract one from the numerator

Add one to the denominator

Three

Two

Four

Five

It is the midpoint between the focus and the directrix

It is the highest point on the graph

It is the intersection of the axes

It is the starting point of the graph

By reflecting points across the polar axis

By ignoring the polar axis

By only plotting points on one side

By using only even angles