Chords do now

The distance around the circle

A line that touches the circle at one point

A chord that passes through the center of the circle

The longest chord in the circle

Two minor arcs are congruent if their corresponding chords are congruent

Chords equidistant from the center are congruent

A diameter bisects a chord and its arc if it is perpendicular

Two chords are congruent if their arcs are congruent

The chord becomes a diameter

The diameter bisects the chord and its arc

The chord is the longest chord in the circle

The circle is divided into two equal parts

Multiply the measure of one minor arc by two

Divide 360 degrees by the measure of one minor arc

Add the measures of the minor arcs

Subtract the measures of the minor arcs from 360 degrees

All chords in a circle are congruent

The longest chord in a circle is the diameter

Two chords are congruent if they are equidistant from the center

Chords that are closer to the center are longer