Which of the following correctly explains using the Product Rule for Exponents?(1 point)
Responses
If the bases are the same, keep the base and multiply the exponents.
If the bases are the same, keep the base and multiply the exponents.
If the bases are the same, keep the base and add the exponents.
If the bases are the same, keep the base and add the exponents.
If the bases are the same, add the bases and add the exponents.
If the bases are the same, add the bases and add the exponents.
If the bases are different, add the bases and add the exponents.
If the bases are the same, keep the base and add the exponents.
Which of the following correctly used the Product Rule of Exponents to simplify the expressions 100 to the eigth power ×100 to the seventh power
100 to the 15th power
200 to the 15th power
10,000 to the 15th power
100 to the 56th power
The correct answer is "100 to the 15th power."
Which of the following is using the Product Rule for Exponents correctly?
53×57=521
5 cubed times 5 to the 7th power is equal to 5 to the 21th power
126×12−5=12
12 to the 6th power times 12 to the negative 5 power is equal to 12
82×810=1612
8 squared times 8 to the 10th power is equal to 16 to the 12th power
326×323=323
32 to the 6th power times 32 cubed is equal to 32 cubed
The correct answer is "12 to the 6th power times 12 to the negative 5 power is equal to 12".
The correct explanation for using the Product Rule for Exponents is:
"If the bases are the same, keep the base and add the exponents."