A boat is pulled in by means of a winch on the dock 12 ft. above the deck of the boat. The winch pulls in rope at a rate of 4 ft/sec. Determine the speed of the boat when there is 13 ft. of rope out.

Find the area under the curve y=x² from x=2 to x=3.

Find the volume of the solid formed by rotating about the y-axis the region enclosed by the graphs of y=x^1/2+1, the y-axis, and the line y=4.

Find the derivative of csc(2x).

What is the acceleration of a particle with the position given as s(t)=4t³-7t?

The height of a rectangular box is 10 in. Its length increases at a rate of 2 in/sec while its width decreases at a rate of 4 in/sec. When the length is 8 in. and the width is 6 in., find the rate at which the volume of the box is changing.

Find the area under the curve y=e^2x from x=1 to x=4.

Find the volume of the solid formed by rotating the region enclosed by y=x^1/2 and y=x² about the line x=-2.

Find the derivative of y=6^log₆^tan(9x).

What is the total distance traveled by a particle if s(t)=t³-3t²-4t at t=5? (in meters)

A 6 ft. tall man is walking towards a building at a rate of 5 ft/sec. Suppose there is a light 50 ft. from the building, determine how fast the man's shadow on the building is shortening when he is 30 ft. from the building.

Find the area under the curve y=6^2x from x=0 to x=2.

The base of a solid is the region enclosed by y=e^x, the x and y axes, and the line x=ln(2). The cross sections perpendicular to the x-axis are squares. Find the volume of the solid.

Find the derivative of y=(xsinx)^1/2.

A particle moves along the x-axis with velocity given by v(t)=3t² -4 for time t>=0. If the particle is at position x=-2 at time t=0, what is the position of the particle at time of the particle at time t = 3