Solve the problem.Let D be the smaller cap cut from a solid ball of radius 8 units by a plane 5 units from the center of the sphere. Set up the triple integral for the volume of D in cylindrical coordinates.

Write interval notation.{x?0 < x < 4}

A. (0, 4) B. (0, 4] C. [0, 4] D. [0, 4)

Solve the inequality and express the solution in set-builder notation and interval notation. Graph the solution set on a real number line.-4(5x - 8) ? -24x + 28

A. {x|x ? -1}; (-?, -1]

B. {x|x > -1}; (-1, ?)

C. {x|x ? -1}; [-1, ?)

D. {x|x < -1}; (-?, -1)

Give the values of Xmin, Xmax, Ymin, and Ymax for the screen, given the values for Xscl and Yscl.Xscl = 4, Yscl = 2

A. [-5, 5] by [-5, 5] B. [-20, 20] by [-10, 10] C. [-10, 10] by [-10, 10] D. [-10, 10] by [-20, 20]

Solve.For the polynomial: , name the terms, the coefficients, the degree, and the constant term.

A. terms: 3, 2, 1, 0 coefficients: -1, 5, 4, -3 degree: 3 constant term: -3 B. terms: -x3, 5x2, 4x, 3 coefficients: -1, 5, 4, 3 degree: 2 constant term: -3 C. terms: -x3, 5x2, 4x, -3 coefficients: 1, 5, 4, -3 degree: 3 constant term: 3 D. terms: -x3, 5x2, 4x, -3 coefficients: -1, 5, 4, -3 degree: 3 constant term: -3