10 5 Segment Lengths in Circles Chords and

10. 5 Segment Lengths in Circles

Chords and Segments on Circles LT: I will use properties of circles to find missing chords and segments Today’s Agenda Success Criteria q. I can find Arcs q. I can use single variable to solve q. I can use properties of Tangents q. I can use properties of Secants üDo Now üLesson üIndependent Practice

Theorem When chords intersect, the chords break into segments that are equal when multiplied.

Theorem When chords intersect, the chords break into segments that are equal when multiplied.

Theorem When chords intersect, the chords break into segments that are equal when multiplied.

Theorem When chords intersect, the chords break into segments that are equal when multiplied.

Theorem When two secants intersect a circle, the segments of the secants (the chord and the whole secant ) are equal when multiplied together.

Theorem When two secants intersect a circle, the segments of the secants (the chord and the whole secant ) are equal when multiplied together.

Theorem When two secants intersect a circle, the segments of the secants (the chord and the whole secant ) are equal when multiplied together.

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Theorem A tangent and a secant

Homework HW#18 Odds