Polynomial Functions
Exponential & Logarithmic Functions
Trigonometric Functions
Functions & Transformations
Rational Functions
100

Find the degree of:

f(x)=4x^5−2x^3+x−7

5

100

Simplify:

log⁡10(1000)

3
100

What is:

sin⁡(90∘)

1

100

Describe the transformation:

y=(x−3)^2

Shift right 3 units

100

Find the vertical asymptote:

f(x)=1/x−2

x=2

200

Find the zeros of:

x^2−9=0

x=3, -3

200

Solve:

2^x=16

4

200

Find the period of:

y=sin⁡(2x)

π

200

Determine if the relation is a function:

(1,2),(1,5),(3,4)

Not a function

200

Find the horizontal asymptote:

f(x)=3x+1/x+5

y=3

300

What is the end behavior of:

f(x)=−2x^4+3x

Falls left and falls right

300

Rewrite in exponential form:

log⁡3(81)=4

3^4=81

300

Solve on [0,2π):

cos⁡(x)=0

x=π/2,3π/2

300

Find:

f(2)

for

f(x)=3x2−1

11

300

Simplify:

x2−9x/−3x−3

x+3

400

Find the vertex of:

f(x)=x^2−6x+5

(3,−4)

400

Solve:

e^2x=20

x=2ln(20)/2

400

Find the amplitude of:

y=−5cos⁡(x)

5

400

Find the inverse of:

f(x)=2x+5

f^−1(x)=x−5/2

400

State the excluded value:

1/x+7

x not=−7

500

Factor completely:

x^3−4x^2−7x+10

(x−5)(x−2)(x+1)

500

A population starts at 200 and grows by 8% yearly. Write the model.

P(t)=200(1.08)^t

500

Use the identity:

sin⁡2(x)+cos⁡2(x)=?

1

500

State the domain of:

f(x)=(square root of)x−4

x≥4

500

Find the holes or asymptotes of:

f(x)=x^2−1/x−1

Hole at x=1x=1

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