Given that set A has 46 elements, set B has 14 elements, and set C has 12 elements, determine the maximum possible number of elements in A?B?C and the minimum possible number of elements in A?B?C.

Use the graph of the rational function f to solve the inequality.Solve f(x) > 0

A. (-?, -3) ? (-3, 1) B. (-?, -3] ? [0, 1] C. (-?, -3) ? (0, 1) D. (0, 1) ? (1, ?)

Simplify the algebraic expression by collecting and combining like terms.9.4ab + 8.7 - 7.1ab - 7.5

A. 2.3ab + 1.2 B. 2.3ab + 16.2 C. 16.5ab + 16.2 D. -2.3ab + 1.2

Use the Binomial Theorem to expand the binomial.(x - 4)5

A. x5 - 20x4 + 320x3 - 1280x2 + 1280x - 1024 B. x5 - 20x4 + 160x3 - 640x2 + 1280x - 1024 C. x5 - 20x4 + 320x3 - 1280x2 + 1280x - 4 D. x5 - 20x4 + 160x3 - 640x2 + 1280x - 4

Evaluate the expression.-1 - 0 - (-7) - 14 + 10

A. -4 B. 30 C. 16 D. 2