Limits
Derivatives
Applications of Derivatives
Integrals
Vocab
100

limx→3(2x+1)

7

100

f(x)=x3+4x2

3x2+8x

100

A derivative tells the _____ of a function.

rate of change

100

∫xdx

x2/2 + c

100

The value a function approaches as x approaches a certain number.

Limit

200

limx→1(x2+5x)

6

200

Find:
d/dx (3x2+2x-7)

6x+2

200

If f′(x) > 0, the function is _____.

increasing

200

∫4x3dx

x4+c

200

The instantaneous rate of change of a function.

Derivative

300

limx→0 sin(x)/x

1

300

d/dx (x2sin x)

2xsin(x)+x2cos(x)

300

If f′′(x) < 0, the graph is _____.

concave down

300

∫ xdx

Find the integral from 0 to 2

2

300

The area under a curve represented mathematically.

Integral

400

limx→4 x2-16/x-4

8

400

d/dx (x1/2)

1/ (2 x1/2)

400

At a local max, f′(x) equals _____.

0

400

The derivative of an integral is explained by the _____.

Fundamental Theorem of Calculus

400

A line that touches a curve at exactly one point and has the same slope there.

Tangent line

500

Determine if continuous at x = 2:
f(x)={x+1,x<25,x=2x2,x>2f(x)=⎩⎨⎧x+1,5,x2,x<2x=2x>2

No

500

d/dx (ex+x3)

ex+3x2

500

A particle’s position is s(t). The derivative s′(t) is _____.

velocity

500

∫cosxdx

sin(x) + C

500

A point where the derivative is zero or undefined, often indicating a max/min.

Critical point

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