Square and Cube Roots
Properties of Exponents
Scientific Notation
Adding and Subtracting with Scientific Notation
Multiplying and Dividing with Scientific Notation
100

53

125

100

30

1

100

Write 5,000 in scientific notation

5 x 103

100

(3 x 104) + (2 x 104)

5 x 104

100

What do you do with the exponents when multiplying numbers in scientific notation?

Add the exponents.

200

(2/5)2

4/25

200

2x 24

2or 128

200

Write 8.2 x 10-3 in standard notation

0.0082

200

What must be the same before you add or subtract numbers in scientific notation?

The exponents

200

(2 x 103) x (3 x 102)

6 x 105

300
(-3)3

-27

300

5-2

(leave no negative exponents)

1/25

300

What does the exponent in scientific notation represent?

The number of times the base is multiplied or divided by 10.

300

(6.5 x 103) - (4.5 x 103)

2.0 x 103

300

(9 x 108) / (3 x 104)

3 x 104

400

√225

15

400

105/102

103 or 1,000

400

Write 0.00047 in scientific notation

4.7 x 10-4

400

(1.2 x 105) + (3.4 x 104)

1.54 x 105

400

(5 x 106) x (2 x 10-2)

1 x 105

500

3√343

7

500

(42)3

4or 4,096

500

Describe the process for writing a number in scientific notation.

1. Create a number between 1 and 10 by moving the decimal.

2. Count the number of times that you moved the decimal. This will be your power of 10.

3. If the original value was greater than one, the exponent is positive.

4. If the original value was less than one (i.e. a decimal), the exponent will be negative.

500

(5.6 x 106) - (1.2 x 107)

6.4 x 106

500

(4.8 x 109) / (8 x 103)

6 x 105

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