Use Method II to simplify the complex rational expression.

Solve the problem. Round your answer, if appropriate.Water is being drained from a container which has the shape of an inverted right circular cone. The container has a radius of 6.00 inches at the top and a height of 10.0 inches. At the instant when the water in the container is 7.00 inches deep, the surface level is falling at a rate of 1.2 in./sec. Find the rate at which water is being drained from the container.

A. 66.5 in.3/s B. 96.1 in.3/s C. 63.5 in.3/s D. 79.2 in.3s

Write the fraction in simplest form. Assume that all variable factors in the denominator are not equal to zero.

A.
B.
C.
D.

For the given logarithmic function, find a) the average rate of change for the interval [2, 6] and b) the interval [3, 5], as well as c) the rate of change at x = 4. Round all calculations to the nearest thousandth.f(x) = log(x + 1.5) + 32.9

A. a) 0.079 b) 0.080 c) 0.083 B. a) 0.160 b) 0.165 c) 0.174 C. a) 0.174 b) 0.165 c) 0.160 D. a) 0.083 b) 0.080 c) 0.079

Solve the problem.A person standing close to the edge on top of a 112-foot building throws a baseball vertically upward. The quadratic equation  models the ball's height above the ground,  in feet, t seconds after it was thrown. How many seconds does it take until the ball finally hits the ground? Round to the nearest tenth of a second if necessary.

A. 1.3 seconds B. 2 seconds C. 176 seconds D. 5.3 seconds