AP Calculus AB

Derivatives

Limits

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Integrals

100

5x²

What is 10x?

100

lim _x-2(8−3x+12x²)

What is 50?

100

lim _x-2x³−7x²+10x/x²+x−6

What is 6/-5?

100

A thin sheet of ice is in the form of a circle. If the ice is melting in such a way that the area of the sheet is decreasing at a rate of 0.5 m²/sec at what rate is the radius decreasing when the area of the sheet is 12 m²?

What is −0.040717?

100

The integral of e^x

What is e^x+C?

200

2t⁴−10t²+13t

What is 8t³−20t+13?

200

lim _x-(-3) 6+4t/t²+1

What is -3/5?

200

Rolle's Theorem

What is "if a function is continous and differentiable on the interval (a,b), and f(a)=f(b), then there is a point where f'(c)=0"?

200

A person is standing 350 feet away from a model rocket that is fired straight up into the air at a rate of 15 ft/sec. At what rate is the distance between the person and the rocket increasing 20 seconds after liftoff?

What is 9.76187?

200

∫6x⁵−18x²+7 dx

What is x⁶−6x³+7x+C?

300

(y−4)(2y+y²)

What is 3y²−4y−8?

300

lim _t-(-1) t+1/|t+1|

What is dne?

300

Derive: (6x²+7x)⁴

What is 4(12x+7)(6x²+7x)³?

300

The radius of a sphere is increasing at a rate of 0.50 centimeters per minute.

At a certain instant, the radius is 17 centimeters.

What is the rate of change of the volume of the sphere at that instant?

What is 578pi?

300

∫10w⁴+9w³+7w dw

What is 2w⁵+9/4w⁴+7/2w²+C?

400

Find the slope of the line tangent to
g(x)=16/x−4√x when x=4.

What is -2?

400

h(z)=

6z, z≤−4

1−9z, z>−4

lim h(z) _x-(-4)

What is DNE?

400

Derive: x²+y³=4

What is y'=−2x/3y²?

400

The radius of the base of a cone is decreasing at a rate of 2 centimeters per minute.

The height of the cone is fixed at 9 centimeters.

At a certain instant, the radius is 13 centimeters.

What is the rate of change of the volume of the cone at that instant?

What is -156pi?

400

∫10t^-3+12t^-9+4t³dt

What is −5t^-2−3/2t^-8+t⁴+C?

500

The position of an object at any time t is given by s(t)=3t⁴−40t³+126t²−9. When is the object moving to the left?

What is −∞<t<0 and 3<t<7?

500

lim _x-0x/3−√x+9

What is -6?

500

Conditions for continuity.

What is, "a function is continous at point (a,b) if:

- f(a) is defined

- the limit as x approaches a of f(x) exists (the limits from both sides are equal)

- the limit as x approaches a of f(x)= f(a)

500

The radius of the base of a cylinder is decreasing at a rate of 12 kilometers per second.

The height of the cylinder is fixed at 2.5 kilometers.

At a certain instant, the radius is 40 kilometers.

What is the rate of change of the volume of the cylinder at that instant?

What is -2400pi?

500

1/x

What is ln x+C?