Properties of Exponents

The Basics

Product Rule

Power Rule

Quotient Rule

Negative Rule

100

A certain part of the Term (i.e. 10^3) has to be kept the same in order for the exponent to multiply, divide, add, or subtract.

Base

100

What operation is happening between the exponent?

Addition

100

The operation happening between the exponents

Multiplication

100

The operation happening between the exponents

Subtraction

100

The 2 step process to convert a negative exponent

1. Put one over the term/turn it into a fraction 2. Remove the negative from the exponent

200

Write each expression using an exponent:

1* (4/5)*(4/5)*(4/5)*(4/5)*(4/5)*(4/5)

(4/5)^6

200

5^3 * 5^6

5^9

200

(6^9)^3

6^12

200

(12^16)/ (12^12)

12^4

200

6^-5

1/(6^5)

300

Evaluate the following:

2⁵

3³

300

(3^6)*(3^-8)

Simply to its simplest form

1/(3^2)

300

The power rule is used when

Provide an example

You have an exponent on the outside of the term.

300

The symbol that lets you know that you are solving a problem with the quotient rule

/ or _

300

Convert 4.2 × 10^–7 to decimal notation

0.00000042

400

The role of an exponent

It tells us how many times we have to multiply the number to itself

400

(j^13)(j^4)(j^6)

Simplify to its simplest form

1/(j^3)

400

((r^6)^8)/((r^3)^9)

r^21

400

(10^5)/(10^7)

Simply to its simplest form

1/(10^2)

400

(4^-7)/(4^-6)

Simply to its simplest form

1/(4^13)

500

This method is used to avoid cumbersome repetition of zeros.

Scientific notation

500

Is (6^-6)*(6^4)= (3^-6)*(3^12)?

500

(10^68)^13

10^884

500

((6^-6)*(6^4))/(6^12)

Simply to its simplest form

1/(6^14)

500

((x^2)/y)^-3

Simply to is simplest form

(y^3)/(x^6)