Find the volume under the surface z = f(x,y) and above the rectangle with the given boundaries.z = e2x + 3y; 0 ? x ? 1, 0 ? y ? 1

Provide an appropriate response.Which of the following statements defines f(x) = ??I. For every positive real number B there exists a corresponding ? > 0 such that f(x) > B whenever x0 - ? < x < x0 + ?.II. For every positive real number B there exists a corresponding ? > 0 such that f(x) > B whenever x0 < x < x0 + ?.III. For every positive real number B there exists a corresponding ? > 0 such that f(x) > B whenever x0 - ? < x < x0.

A. I B. III C. II D. None

Express the following in interval notation.{x|x > 9}

A. (-?, 9] B. [9, ?) C. (-?, 9) D. (9, ?)

For the function find the maximum number of real zeros that the function can have, the maximum number of x-intercepts that the function can have, and the maximum number of turning points that the graph of the function can have. g(x) = x3 - 11x + 10

A. 3; 2; 1 B. 3; 3; 2 C. 4; 3; 2 D. 3; 1; 1

Locate relative maximum and relative minimum points on the graph. State whether each relative extremum point is a turning point.

A. (-1, -2) is a relative maximum. B. (-1, -2) is a relative minimum and a turning point. (0, 0) is a relative maximum. C. No relative extrema. D. (-1, -2) is a relative minimum and a turning point.