Express the area of the region bounded by the given line(s) and/or curve(s) as an iterated double integral.The curves  and 

Solve the problem.City A, City B, and City C are together undertaking a road construction project. The nine-member committee has representatives allocated to the committee in proportion to the population in each city. City A has a population of 15,000, City B has a population of 18,000, and City C has a population of 19,000. Apportion the committee seats using the Hamilton method and the  method.

A. City A: 2; City B: 3; City C: 4 (Hamilton method); City A: 3; City B: 3; City C: 3 (Huntington-Hill method) B. City A: 3; City B: 3; City C: 3 (Both methods) C. City A: 3; City B: 3; City C: 3 (Hamilton method); City A: 2; City B: 3; City C: 4 (Huntington-Hill method) D. City A: 2; City B: 3; City C: 4 (Both methods)

Evaluate the expression for the given replacement values.z ÷ 0.6 for z = 0.408

A. 1.471 B. 14.706 C. 0.68 D. 6.8

The revenue R (in dollars) generated by the sale of x units of a digital camera is given by . Approximate the number of sales that will maximize revenue. ?

A. Maximum revenue occurs at units.
B. Maximum revenue occurs at units.
C. Maximum revenue occurs at units.
D. Maximum revenue occurs at units.
E. Maximum revenue occurs at units.

Use a graphing utility to graph the function over the indicated interval and approximate any local maxima and local minima. Determine where the function is increasing and where it is decreasing. If necessary, round answers to two decimal places.f(x) = x3 - 4x2 + 6; (-1, 4)

A. local maximum at (0, 6) local minimum at (2.67, -3.48) increasing on [0, 2.67] decreasing on [-1, 0] and [2.67, 4] B. local maximum at (2.67, -3.48) local minimum at (0, 6) increasing on [-1, 0] and [2.67, 4] decreasing on [0, 2.67] C. local maximum at (0, 6) local minimum at (2.67, -3.48) increasing on [-1, 0] and [2.67, 4] decreasing on [0, 2.67] D. local maximum at (2.67, -3.48) local minimum at (0, 6) increasing on [0, 2.67] decreasing on [-1, 0] and [2.67, 4]