Points C and D divide the semicircle into three equal parts. Match the angles with their measures.

∠CAE
A. ∠CAD
B. ∠BAE
C. ∠DEC
D. 15°
E. 30°
F. 60°
G. 120°
H. 180°

∠CAE = 120°
∠CAD = 60°
∠BAE = 180°
∠DEC = 30°

We start out with the fact that points C and D split the semicircle into 3 sections. This means that ∠BAC, ∠CAD and ∠DAE are all 60° (180/3 = 60).

Since it forms a straight line, ∠BAE is 180°.

Since it is formed by ∠CAD and ∠DAE, ∠CAE = 60+60 = 120°.

We know that an inscribed angle is 1/2 of the corresponding arc; since CD is 1/3 of the circle, it is 1/3(180) = 60; and this means that ∠DEC = 30°.

wrighlad wrighlad · Answer 2 · 2018-11-13T20:50:07+01:00

wrighlad wrighlad

13-11-2018

If this person is correct then it should look like this if you have Plato

your welcome ;0 =)

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Points C and D divide the semicircle into three equal parts. Match the angles with their measures. ∠CAE A. ∠CAD B. ∠BAE C. ∠DEC D. 15° E. 30° F. 60° G. 120° H. 180°

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Points C and D divide the semicircle into three equal parts. Match the angles with their measures.

∠CAE
A. ∠CAD
B. ∠BAE
C. ∠DEC
D. 15°
E. 30°
F. 60°
G. 120°
H. 180°