Understanding Gradients and Focal Chords

You end up with the same line equation.

The slope changes but the intercept remains the same.

The equation becomes undefined.

You get different lines.

Because the order of P and Q does not affect the line equation.

Because P and Q have different slopes.

Because P and Q are on different lines.

Because P and Q are always equal.

Because they are not part of the syllabus.

Because understanding them is more important for proving them in exams.

Because they are not used in exams.

Because they are too complex.

A chord that lies entirely outside the parabola.

A chord that passes through the focus of the parabola.

A chord that is parallel to the directrix.

A chord that is perpendicular to the axis of symmetry.

It is the midpoint of the chord.

It is the endpoint of the chord.

It is the focus through which the focal chord passes.

It is the vertex of the parabola.

By checking if it is horizontal.

By measuring its length.

By verifying if it passes through the focus.

By checking if it is parallel to the directrix.

They are parallel to each other.

They do not intersect.

They intersect at the vertex.

They are perpendicular to each other.

They are both zero.

They are both positive.

They are negative reciprocals of each other.

They are equal.

The lines do not intersect.

The lines are identical.

The lines are perpendicular.

The lines are parallel.

It changes the color of the parabola.

It alters the width of the parabola.

It moves the vertex of the parabola.

It changes the direction of the parabola.