Converse Theorems and Intercepts

Removing the conclusion

Switching the premise and conclusion

Adding more premises

Changing the theorem's variables

Angles are complementary

Lines are skew

Ratios of intercepts are equal

Lines are perpendicular

Ignoring the premise

Using a different theorem

Finding a counterexample

Proving the original theorem

The converse is disproven

The original theorem is invalid

The converse is proven true

The premise is changed

They help in proving the theorem

They are used to draw tangents

They are irrelevant to the theorem

They determine the circle's radius

Secants

Chords

Tangents

Diameters

The circle's circumference is determined

A unique property about intercepts is observed

The chords are parallel

The circle's area is calculated

The intercepts are irrelevant

The converse can be disproven

The original theorem is false

The converse is always true

They help in disproving the converse

They determine the theorem's validity

They are used to draw circles

They are irrelevant to the theorem

The converse is a reversed statement

They have no connection

The converse is always false

They are always equivalent