Properties and Equations of Parabolas

It is the intersection of the tangents.

It is the vertex of the parabola.

It is the midpoint of the chord PQ.

It is the focus of the parabola.

To verify the equation of the parabola.

To confirm the tangent line is horizontal.

To ensure the tangent equation is correct.

To determine the length of the chord.

y = mx + c

y - y1 = m(x - x1)

y = px - 2ap^2

y = qx - aq^2

By using the distance formula.

By averaging the coordinates of P and Q.

By finding the intersection of tangents.

By using the slope-intercept form.

The tangents form a circle.

The tangents intersect at the vertex.

The tangents are perpendicular.

The tangents are parallel.

It is the focal point of the parabola.

It is the line where the y-coordinate is -a.

It is the line where tangents intersect.

It is the axis of symmetry.

By showing MT is horizontal.

By proving MT is vertical.

By calculating the slope of MT.

By finding the midpoint of MT.