7.1B – Circumference and Arc Length

7.1B – Circumference and Arc Length R.4.G.5 Investigate and use the properties of angles (central and inscribed) arcs, chords, tangents, and secants to solve problems involving circles

Circle Vocabulary The middle…duh… Center: Radius: A line segment drawn from the center to any point on the circle Diameter: A line segment drawn across a circle that passes through the center (twice the radius)

Circumference The distance around the outside of the circle C = 2πr C = πd Circumference is: Circumference formulas:

21 m 8 m Examples Find the circumference of the circle:

Arcs R T 45o S Definition: An arc is an unbroken part of a circle Minor Arc: Shortest path between two points Name of minor Arc: Measure of minor Arc:

Arcs (cont.) R T 45o S Major Arc: The longest path between two points Name of major arc: Measure of major arc:

Arc Length An arc’s length is based on the Circumference of the circle and theMeasure of its arc. Formula for Arc Length: Arc Length = or…

120° 6 in Example A B C Find the length of arc AB. Leave your answer in terms of π.

120° 6 in Example A B C Find the length of arc ACB. Leave your answer in terms of π.

45° 10 cm Now You Try… P M L Find the length of arc MP. Leave your answer in terms of π.

45° 10 cm Now You Try… P M L Find the length of arc MLP. Leave your answer in terms of π.

7.1B – Circumference and Arc Length