Calculus AB

Power Rule

Product/Quotient Rule

Trigonometric Functions

Chain Rule

Random Calculus

100

Derive: x²

100

Let g be a function such that g(4)=8, and g'(4)=-3

Let h be the function h(x)=x^1/2

Let H be a function defined as H(x)=g(x)⋅h(x)

What is H′(4)=?

-4

100

Derive: sin(x)

cos(x)

100

Derive: sin(x²)

2xcos(x²)

100

For y=x, what is the limit as x approaches 1.

200

Derive: x³

3x²

200

Table:

x g(x) h(x) g'(x) h'(x)

0 -3 -1 5 3

F(x)=g(x)⋅h(x)

What is F'(0)=?

-14

200

Derive: cos(x)

-sin(x)

200

Derive: (x²)^1/2

2x/(x²)^1/2

200

Approximate the area between the x-axis and f(x) from x=10 to x=16 using trapezoidal sum with 3 equal subdivisions:

x 10 12 14 16

f(x) 5 1 7 7

300

Derive: x¹⁰

10x⁹

300

Derive: cos(x)/sin(x)

-1/sin(x)²

300

Derive: sec(x)

(sec(x))(tan(x))

300

Table:

x f(x) g(x) f'(x) g'(x)

1 4 2 3 -2

2 6 1 1 0

G(x)=f(g(x)), what is G'(2)?

G'(2)=0

300

A particle moves in a straight line with a velocity v(t) meters per second, where t is the time in seconds. At t=3, the particle's distance from the starting point was 12 meters in the positive direction. What was the particle's position at t=9 seconds?:

How would you write an expression to represent this?

12 + ⁹₃| v(t) dt

400

Derive: 3x¹²

36x¹¹

400

Table:

x g(x) h(x) g'(x) h'(x)

-2 4 1 -1 2

H(x)=g(x)/h(x)

What is H'(-2)=?

H'(-2)=-9

400

Derive: arcsin(x)

1/(1-x²)^1/2

400

f(x)= -5 x 7^x

Find f '(x)

-5 x 7^xln(7)

400

Let f be a twice differentiable function, and let f(-7)=6, f'(-7)=0, and f''(-7)=-5

What occurs in the graph of f at the point (-7,6)?

(-7,6) is a maximum point

500

Derive: 9x⁶

54x⁵

500

Derive: y=x²ln(x)

x+2xln(x)

500

Derive: cot(x)

-csc²(x) or -1/sin(x)²

500

y= tan(x² - 4x)

Find dy/dx (Derivative)

2x - 4 / cos²(x² - 4x)

500

f(x)=2x³-9x²+12x

Where does f have critical points?

x= 1 and 2