Exponent Law 1
Exponent Law 2
Exponent Law 3
Name the Mistake
Evaluate
100

Write as a single power:

(35)(310)

What is 315

100

Write as a single power:

1512 / 157

What is 155

100

Write as a single power:

(46)3

What is 418

100

Identify the error:

x5x7=x35

Multiplied the exponents

Answer: x12

100

35

What is 243

200

Write as a single power:

x2x4x3

What is x

200

Write as a single power:

[(-3)4]

What is [(-3)12]

200

Write as a single power:

(28)5

What is 240

200

Identify the error:

(24)(24)=44

Multiplied the bases and kept exponents the same.

(24)(24)=28

200

(-11)2

What is 121

300

Write as a single power:

(1257)(1254)

What is 12511

300

Write as a single power:

x12 / x7

What is x5 

300

Write as a single power:

(x4)3

What is x12

300

(4x5)3=12x15

Multiplied the coefficient of 4 by 3 rather than raising 4 to the power of 3. 

43 = 64 is not the same as 4(3) = 12

(4x5)3=64x15

300

-32

What is -9

400

Write as a single power:

(-x)4(-x)10

What is (-x)14

400

Write as a single power:

x8 / x8

What is xor 1

400

Write as a single power:

(am)n


What is amn(-3)10

400

Identify the error

(4x5)3 = 64x8

Added exponents 5 and 3, rather than multiply

(4x5)3 = 64x15

400

(-5)0

1

500

Write as a single power:

(712 x 72) ÷ 77


What is 77

500

Write as a single power:

[(-3)10÷(-3)3]2

What is (-3)12

500

Write as a single power:

[(-3)4]÷ (-3)2

What is (-3)10

500

Identify the error:

(5b2)(2b6)= 7b8

Added 5 and 2, rather than multiplying them.

7b8

500

-50

-1

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