AP Calculus AB Review Nuoyi Zhan

Limits

Derivatives

Integrals

Areas/Volumes

Differential Equations

100

Limit x-->1 of 3x²+x+16

100

Find the derivative of ((x)^1/2)+sin(1-x)

(1/2(x)^1/2-cos(1-x)

100

∫⁶₀ 3x²-2x+1 dx

((6)³- (6)²+6)-((0)³-(0)²+0)

216-36+6-0 = 186

100

A region is bonded by the x-axis and y=x²+x-6, find the area between the curve.

∫²_-3 (x²+x-6) dx = -125/6

100

dy/dx=cos(x)y

dy/y=cos(x) dx

∫dy/y=∫cos(x) dx

ln(y)=sin(x)+c

y=Ce^sin(x)

200

Limit x-->+infinity 1/5x²

Limit x-->+infinity 1/5x²=0

200

Find the derivative (dy/dx) of x⁴+2x³+4x²+6x+1+cos(3x)+5xe^x

dy/dx = 4x³+6x²+8x+6-3sin(3x)+5e^x+5xe^x

200

S(t) is a differential function that represents the speed of the car in miles, where t is measured in hours. Explain the meaning of S’(20).

The acceleration (rate of change in speed S(t)) in miles/hour² of the car when t=20 hours.

200

The base of a solid is the region enclosed by y=x²-10x+21 and the x-axis, find the volume of the solid that has square cross sections perpendicular to the x-axis.

∫⁷₃ (x²-10x+21)² dx = 512/15

200

dy/dx=3xy+4x²+y

Find d²y/dx².

d²y/dx²=3(dy/dx)+8x+(dy/dx)

d²y/dx²=3(3xy+4x²+y)+8x+(3xy+4x²+y)

300

Limit x-->-infinity (5x³+4x²+8x+1)/(3x³+7x²+15x+2)

5/3

300

Does function f(x) = (x³/3)-3x²+9x+1 have any local extrema?

x²-6x+9 = f’(x)

x²-6x+9 = 0

(x-3)(x-3) = 0

Possible critical point at x = 3

Test numbers: 0,6

f(2) = 1 f(6) = 19

No local extrema.

300

∫60x²(4)^{(20x^3)-}⁵ dx

u = 20x3-5

du/dx = 60x²

du/60x² = dx

∫60x²(4)^(u) du/60x²

∫ (4)^(u) du

(4^(u)/ln(4))+c

(4^{(20x^3)-5}/ln(4))+c

300

The base of a solid is the region enclosed by f(x)=3sqrt(x) and g(x)=x, find the volume of the solid that has equilateral triangle cross sections perpendicular to the y-axis.

x = (y/3)²

x=y

∫⁹₀ (sqrt(3)/4)(y-(y/3)²)² dy = (27/2)(sqrt(3)/4) = 27(sqrt(3))/8

300

dy/dx=(4x+e^x)/2y

2y dy=(4x+e^x) dx

∫2y dy=∫(4x+e^x) dx

y²=2x²+e^x

y=+/-sqrt(2x²+e^x)

400

Limit x-->1 (x²+3x-4)/(sin(pix))

Limit x-->1 (x²+3x-4)=0

Limit x-->1 (sin(pix))=0

Use L’Hopital’s Rule

Limit x-->1 (2x+3)/((pi)cos(pix))=-5/pi

400

Given the function f’(x) = (x²+3)/cos(x), and that -4<x<4, at which interval does the function f(x) is concaving down? Explain.

(-4,0) because f’(x) is decreasing in that interval.

400

∫e^2xcos(3x)

v=e^2x du=cos(3x)

dv=2e^2x u=(sin(3x))/3

∫e^2xcos(3x)=((sin(3x))/3)(e^2x)-∫(sin(3x))/3) 2e^2x dx

v=2e^2x du=(sin(3x))/3

dv=4e^2x u=(-cos(3x))/9

∫e^2xcos(3x)=((sin(3x))/3)(e^2x)-((-cos(3x))/9)(2e^2x)+∫((-cos(3x))/9)(4e^2x) dx

∫e^2xcos(3x)=((sin(3x))/3)(e^2x)-((-cos(3x))/9)(2e^2x)+(-4/9)∫cos(3x)(e^2x) dx

(13/9)∫e^2xcos(3x)=((sin(3x))/3)(e^2x)-((-cos(3x))/9)(2e^2x)

∫e^2xcos(3x)= (((sin(3x))/3)(e^2x)-((-cos(3x))/9)(2e^2x))(9/13)

400

The region R enclosed by y=(4sqrt(x))+1 and x=8, and is rotated around the x-axis, find the volume of the solid that has been formed.

pi∫⁸₀ ((4sqrt(x))+1)² dx = 640.680pi

400

The rate of change of F is proportional to F, when t=0, F=200, and when t=2, F=500, what is the value of F when t=4?

dF/dt=kF

ln(F)=kt+c

C=200

F=200e^kt

500=200e^k(2)

k=0.458

F=200e^0.458t

F=200e^0.458(4)

F=1250

500

The continuous and differentiable function f is given by f(x)={ax+5 for x less than or equal to 6, 3x²+b for x>6. Find a+b.

ax+5=3x²+b

a=6x

a=36

36x+5=3x²+b

36(6)+5=3(6)²+b

221=108+b

b=113

36+113=149

a+b=149

500

A cylinder can fill with water has an unknown volume initially, and the water is gradually leaking out from the hole on its bottom side at a rate. The volume of the cylinder is given by the equation V=(pi)r²h. Suppose that the cylinder has a radius of 3 cm, what is the can’s instantaneous rate of change in height at the moment where its instantaneous rate of change in volume is at 4cm³/minute?

dV/dt = (pi)r²(dh/dt)

4 = pi(3)²(dh/dt)

dh/dt = 4/9pi

500

An object is moving to the right horizontally with an acceleration given by the function a(t) = 6t+4, at t = 1, the object’s velocity is 10 cm/minute, at t = 2, the object’s position is at 28 cm, what is the function that represent the object’s position in p(t)?

a(t) = 6x+4

v(t) = ∫a(t) dt = 3x²+4x+c

v(1) = 3(1)²+4(1)+c = 10 c = 3

v(t) = 3x²+4x+3

p(t) = ∫v(t) dt = x³+2x²+3x+c

p(2) = (2)³+2(2)²+3(2)+c = 28 c = 6

p(t) = x³+2x²+3x+6

500

The region R enclosed by y=10-x² and y=5, and is rotated around the x-axis, find the volume of the solid that has been formed.

pi∫^2.236068_-2.236068 (10-x²)²-(5)² dx = 208.700pi

500

Find the time necessary for $1000 to triple if it is invested at a rate of 3.5% compounded daily.

A=1000(1+(0.035/365))^365t

3000=1000(1+(0.035/365))^365t

t=31.39 years.