### Geometry Problem**Problem Statement:**In circle $ N $ with $\angle MNP = 120^\circ$, find the measure of arc $ MQP $.**Diagram Explanation:**The diagram shows a circle labeled $ N $. Inside the circle, three points $ M, N, $ and $ P $ are marked on the circumference. There is an arc from $ M $ to $ P $ passing through $ Q $. The angle $ MNP $ is given as $ 120^\circ $.- $M$ and $P$ are points where the chord intersects the circumference at two places.- $N$ is the center of the circle.- The angle $\angle MNP$ formed at the center by points $ M $ and $ P $ is $ 120^\circ $.### Steps to Solve:1. **Identify the Given Angle:** - The central angle $\angle MNP$ is $120^\circ$.2. **Understanding Arc Measure:** - The measure of the arc is directly related to its corresponding central angle. In a circle, the measure of the arc is equal to the central angle that subtends it.3. **Calculate Arc $ MQP $:** - Since $\angle MNP$ is $120^\circ$, the measure of arc $ MQP $ is also $120^\circ$.**Answer:**The measure of arc $ MQP $ is $ 120^\circ $.

Answered: Image /qna-images/answer/7adb1327-5813-4300-91ed-3a00cbb39196.jpg

Answered: 1. In circle with MNP = 12 a, find the…

Math

Geometry

1. In circle with MNP = 12 a, find the %3D

Elementary Geometry For College Students, 7e

7th Edition

ISBN:9781337614085

Author:Alexander, Daniel C.; Koeberlein, Geralyn M.

Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.

ChapterP: Preliminary Concepts

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Question

### Geometry Problem

**Problem Statement:**
In circle $ N $ with $\angle MNP = 120^\circ$, find the measure of arc $ MQP $.

**Diagram Explanation:**
The diagram shows a circle labeled $ N $. Inside the circle, three points $ M, N, $ and $ P $ are marked on the circumference. There is an arc from $ M $ to $ P $ passing through $ Q $. The angle $ MNP $ is given as $ 120^\circ $.

- $M$ and $P$ are points where the chord intersects the circumference at two places.
- $N$ is the center of the circle.
- The angle $\angle MNP$ formed at the center by points $ M $ and $ P $ is $ 120^\circ $.

### Steps to Solve:
1. **Identify the Given Angle:**
- The central angle $\angle MNP$ is $120^\circ$.

2. **Understanding Arc Measure:**
- The measure of the arc is directly related to its corresponding central angle. In a circle, the measure of the arc is equal to the central angle that subtends it.

3. **Calculate Arc $ MQP $:**
- Since $\angle MNP$ is $120^\circ$, the measure of arc $ MQP $ is also $120^\circ$.

**Answer:**
The measure of arc $ MQP $ is $ 120^\circ $.

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