radicals
Positive exponents
properties of exponents
Rearranging Formulas
Evaluate without a Calculator
Back and Forth
100

What must be true when adding and subtracting radicals.

1- The Radicals have the same radical form.

100

Define exponent.

Number that tells you how many times your write your base and multiply.

100

a0=?

1

100

V = lwh

h = ?

h = V/lw

100

105

100 000

100

Rewrite in Exponential form: 

root3(27)

27^{1/3}

200

Is this true or false, any non zero number with an exponent of zero is equivalent to 1?

True

200

Solve this 7(81)= 

The answer is 56.

200

am * an=?

am+n

200

s=d/t

t = ?

t = d/s

200

70

1


200

Rewrite with rational exponents:

root(3)((3x)^2)

(3x)^{\frac{2}{3}}


300

What base, raised to the 0 exponent, is not one?

Zero

300

Solve this 

\frac{21d^{18}e^5}{7d^{11}e^3}

The answer is 3d7e2

300

(ab)n=?

an/bn

300

solve for F when C = 35:

C = [5(F-32)]/9

F = 95

300

(3/4)2

9/16

300

Rewrite in Radical Form: 

64^(2/3)

(root3(64))^2

400

What is the solution with a positive exponent; (a5)-1

The answer is 1/a5

400

What is the solution to this problem?

(\frac{36a^5}{4a^4b^5})^{-2}

The solution would be 

\frac{b^{10}}{81a^2}

400

(a/b)m=?

am/bm

400

2-3

1/8

400

Rewrite in Radical Form: 

(1/81)^(1/4)

root4(1/81)

500

When multiplying radicals you have to what?

1- Multiply any coefficients

2- Multiply the radicals

3- Keep the same root

500

Solve this;

 4a3b(3a-4b-3)

The answer is 

\frac{12}{ab}


500

a-n=?

1/an

500

(1/6)-2

6

500

Solve the following:

8^(2/3)

4

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