Answered

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In the Venn diagram, consider U = {students in 10th grade at Lee High School}.

The diagram shows the electives chosen by the students in the 10th grade.

3 circles labeled Chorus, Painting, and Theater overlap. Chorus contains 7, painting contains 8, and theater contains 9. The overlap of chorus and theater contains 16, the overlap of theater and painting contains 4, and the overlap of chorus and painting contains 3. The overlap of all 3 circles contains 2.

How many students chose to participate in the painting class?

8
11
14
17

Sagot :

The number of students that chose to participate in the painting class is 17. The correct option is the last option  17

Venn Diagram

From the question, we are to determine the number of students that chose to participate in the painting class

In the Venn diagram,

We can observe that  

3 students chose Chorus and Painting

2 students chose Chorus, Theater, and Painting

4 students chose Theater and Painting

and

8 students chose painting only

Thus,

The number of students that chose to participate in the painting class = 3 + 2 + 4 + 8

= 17

Hence, the number of students that chose to participate in the painting class is 17. The correct option is the last option  17

Learn more on Venn Diagram here: https://brainly.com/question/13381693

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