Use a Venn diagram to answer the question.A survey of 143 college students was done to find out what elective courses they were taking. Let A = the set of those taking art; B = the set of those taking basket weaving; and C = the set of those taking canoeing. The study revealed the following information:n(A) = 45; n(B) = 55; n(C) = 40; n(A ? B) = 12; n(A ? C) = 15; n(B ? C) = 23; n(A ? B ? C) = 2.How many students were not taking any of these electives?

Evaluate the integral. 

A. 2145
B.
C. 99
D.

Find the prime factorization of the number.1162

A. 14 ? 83 B. 72 ? 83 C. 22 ? 83 D. 2 ? 7 ? 83

Solve the problem.Under a certain apportionment method, a state receives an apportionment of 52 seats when the total number of seats in the legislature is 334 but only 51 seats when the total number of seats in the legislature is 335. This is called

A. the population paradox. B. a violation of the quota rule. C. the Alabama paradox. D. the new states paradox. E. none of these

Use the circle graph to solve the problem.A survey of the 9729 vehicles on the campus of State University yielded the following circle graph.Find the number of hatchbacks. Round your result to the nearest whole number.

A. 3989 B. 6227 C. 36 D. 3502