Question

In the same circle, chord AB determines a 115° arc and chord

AC determines a 43° arc. Find m∠BAC.

Answer 1

101 degrees

Explanation:

- A circle with two chords

- The two cords have common start point A on the circle

- The chord AB subtended arc AB with measure 115°

- The chord AC subtended arc AC with measure 43°

- The measure of any circle is 360°

* These two cords divide the circumference of the circle into

three arcs, arc AB , arc AC and arc BC

∵ The measure of arc AB = 115°

∵ The measure of arc AC = 43°

∵ The measure of the circle is 360°

∴ The measure of arc BC = 360 - (115 + 43) = 360 - 158 = 202°

- In the circle, the angle whose vertex is on the circle is

called inscribed angle and subtended by the opposite arc,

its measure is half the measure of the subtended arc

∵ ∠BAC is an inscribed angle subtended by arc BC

∴ m∠BAC = 1/2 measure of arc BC

∵ The measure of arc BC = 202°

∴ m∠BAC = 202 ÷ 2 = 101°

Answer 2

The measure of angle BAC = 101°

Explanation:

* Lets study the problem

- A circle with two chords

- The two cords have common start point A on the circle

- The chord AB subtended arc AB with measure 115°

- The chord AC subtended arc AC with measure 43°

- The measure of any circle is 360°

* These two cords divide the circumference of the circle into

three arcs, arc AB , arc AC and arc BC

∵ The measure of arc AB = 115°

∵ The measure of arc AC = 43°

∵ The measure of the circle is 360°

∴ The measure of arc BC = 360 - (115 + 43) = 360 - 158 = 202°

- In the circle, the angle whose vertex is on the circle is

called inscribed angle and subtended by the opposite arc,

its measure is half the measure of the subtended arc

∵ ∠BAC is an inscribed angle subtended by arc BC

∴ m∠BAC = 1/2 measure of arc BC

∵ The measure of arc BC = 202°

∴ m∠BAC = 202 ÷ 2 = 101°