No Calc

A particle moves along the x-axis. The graph of the particle’s velocity v(t) at time t is shown above for 0<t<4.5. How many times does the particle change direction over the time interval 0<t<4.5 ?

A mechanic is reboring a 6-in-deep cylinder to fit a new piston. The machine they are using increases the cylinder’s radius one-three thousandth of an inch every minute. How rapidly is the cylinder's volume is increasing when the bore diameter is 3.8 inches. Volume of a cylinder is V=pir^2h

No Calc

The locally linear approximation of the differentiable function f at x=3 is used to approximate the value of f(3.2). The approximation at x=3.2 is an overestimate of the corresponding function value at x=3.2. Which of the following could be the graph of f?

A:

B:

C:D:

Which of the following limits does not yield an indeterminate form?

A

limx→0 4x³/(cos(x)−1)

B

limx→3 ln(x/3)/(x²−7x+12)

C

limx→π (π−x)/(sin(2x)−1)

D

limx→∞ x¹⁰/(e^2x+x)

Let the function

P(t)=(3e^-sin(t))/t

represent the amount of medication (in mg) in a patient's system at t minutes. What is the rate at which the medication is changing at 6 minutes rounded to the nearest hundredth.

A water tank has the shape of an inverted circular cone with base radius 2m and height 4m. If water is being pumped into the tank at a rate of 2 m³ /min, What is the rate at which the water level is rising when the water is 3 m deep. Volume of cone is V=(1/3)pir^2h

Let f(x) be a differentiable function that is concave up across its domain. This is the approximate value of f(3.4) at x=3 given f(3)=9 and f'(3)=5.

This is the result of

lim_(x\rightarrow0)tan(x)/(x+sin(x))

No Calc

A particle moves along the y-axis so that at time t≥0 its position is given by y(t)=(2/3)t³-5t²+8t. Over the time interval 0<t<5, for what values of t is the speed of the particle increasing?

A piece of rubber tubing maintains a cylindrical shape as it is stretched. At the instant that the inner radius of the tube is 2 milimeters and the height is 20 milimeters, the inner radius is decreasing at the rate of 0.1 milimeter per second and the height is increasing at the rate of 3 milimeters per second. Which of the following statements about the volume of the tube ist rue at this instant? (Volume of cylinder is V=pir^2h)

A) The volume is increasing by 4pi cubic milimeters per second.

B) The volume is decreasing by 4pi cubic milimeters per second.

C) The volume is decreasing by 20pi cubic milimeters per second.

D) The volume is increasing by 20pi cubmic milimeters per second.

No Calc

Let f be the function given by f(x) = 2 cos x + 1. What is the approximation for f(1.5) found by using the line tangent to the graph of f at x = π/2 ?

No Calc

The figure above shows the graph of the twice-differentiable function f and the line tangent to the graph of f at the point (0,2). The value of

limx→0 (f(x)e^-x−2)/(x²−2x) is