Powers of Ten Order Of Operations Exponent Laws

Powers of Ten Order Of Operations Exponent Laws I I am so Smart 100 100 100 200 200 200 300 300 300 400 400 400 500 500 500

Identify the exponent in the following example: 3 5

What is 3?

Write 27 as a power with base 3.

What is 3 3

e l b u o D y l i a D Write 16 as two different powers with different bases.

What is 42 and 24.

Write 64 as two different powers with the same base.

What is 6 2 and 2 3 (2 )

Write 64 as three different powers with different bases.

What is 6 2, 3 4, 2 8.

Evaluate (7 x 0 3) - 0 5

What is 0

Write 100, 000 as a power of 10.

What is 5 10.

Write 202 as powers of 10.

What is: 2 0 (2 x 10 ) + (2 x 10 )

3 10 1 10 What is + – equal to? 0 10

What is 1009.

What does: 2 1 1 0 (10 x 10 ) ÷ (10 ÷ 10 ) simplify to as a power of 10?

What is 2 10

What order of Operations do we follow?

What is BEDMAS?

Evaluate: 3 + 2 4

What is 19

Evaluate: 3 + 2 x 4 – 2 x 5

What is: 1

Which answer is the larger expression. What is the answer? 3 3 2 3 x 2 – 5 or 2 (3 x 2) – 5 x 5

What is 33 x 23 – 52 = 191

Evaluate: –(33 – 4 x 52)0 / (– 2)3

What is -1/8.

State the Exponent Law for a Product of Powers

What is: to multiply powers with the same base we add the exponents.

Simplify and evaluate: 3 0 (-2) ÷ (-2)

What is -8

Simplify: 2 3 x 6 3 ÷ 4 3

What is: 4 3

Evaluate: 3 5 2 6 (4 x 4 ) ÷ (4 x 4 )

What is 1.

Evaluate: 6 5 3 1 (-3) ÷ (-3) – (-3) x (-3)

What is: -84

State the Exponent Law for a Power of a Power.

What is: to raise a power to a power, we simply multiply the exponents.

Simplify: 2 3 2 2 (2 ) ÷ (2 )

What is 2 2.

e l b u o D y l i a D Write 64 as a power of powers with 2 different exponents other than one.

What is: 2 3 (2 )

Simplify: 2 3 5 (3 ÷ 3 )

What is: 9 3.

Write the following as a power of a power with base two not using one as an exponent. ( 32 x 64) ÷ 128

What is 2 2 (2 )