Product Rule of Exponents - Pre-Algebra
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify:
Simplify:
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When you multiply exponents with the same base, you add the exponents:
When you multiply exponents with the same base, you add the exponents:
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Simplify the following expression:
Simplify the following expression:
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The exponent represents how many times the term is being multiplied. So, for example, 
means 
and 
would be 
So the first term 
And the second term
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients, 
We also have a total of 
's all being multipled together.
The final answer is 
The exponent represents how many times the term is being multiplied. So, for example,
So the first term
And the second term
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients,
We also have a total of
The final answer is
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Evaluate:
Evaluate:
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Distribute the 
to each of the terms and add them.
Distribute the
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Simplify the following.
Simplify the following.
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The Product of Powers Property states when we multiply two powers with the same base, we add the exponents.
In this case, the exponents are 2 and 5
The Product of Powers Property states when we multiply two powers with the same base, we add the exponents.
In this case, the exponents are 2 and 5
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Simplify:
Simplify:
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When multiplying variables with exponents, we must remember the Product Rule of Exponents: 
Step 1: Reorganize the terms so the terms are together:
Step 2: Multiply 
:
Step 3: Use the Product Rule of Exponents to combine 
and 
, and then _
_and 
:
When multiplying variables with exponents, we must remember the Product Rule of Exponents:
Step 1: Reorganize the terms so the terms are together:
Step 2: Multiply
Step 3: Use the Product Rule of Exponents to combine
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Simplify:
Simplify:
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Use the product rule of exponents, which states that when multiplying expression(s) with the same base, you add the exponents together:
Therefore the correct answer is 
.
Use the product rule of exponents, which states that when multiplying expression(s) with the same base, you add the exponents together:
Therefore the correct answer is
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Simplify the following expression:
Simplify the following expression:
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The exponent represents how many times the term is being multiplied. So, for example, means and would be
So the first term 
And the second term 
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients, 
We also have a total of 6 
's and 1 
all being multipled together.
The final answer is 
The exponent represents how many times the term is being multiplied. So, for example,
So the first term
And the second term
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients,
We also have a total of 6
The final answer is
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Simplify the following expression:
Simplify the following expression:
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The exponent represents how many times the term is being multiplied. So, for example, means and would be
So the first term 
And the second term 
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients, 
We also have a total of 4 
's and 2 
's all being multipled together.
The final answer is 
The exponent represents how many times the term is being multiplied. So, for example,
So the first term
And the second term
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients,
We also have a total of 4
The final answer is
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Simplify the following expression:
Simplify the following expression:
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The exponent represents how many times the term is being multiplied. So, for example, means and would be
So the first term 
= 
And the second term 
= 
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients, 
We also have a total of 8 
's and 4 
's all being multipled together.
The final answer is 
The exponent represents how many times the term is being multiplied. So, for example,
So the first term
And the second term
Since the two terms are only separated by parentheses, they are being all multiplied together.
First multiply the coefficients,
We also have a total of 8
The final answer is
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Simplify the following expression:
Simplify the following expression:
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In the last few problems, we saw one way to multiply terms with exponents.
Another way to explain what we did is to say: "When you MULTIPLY terms together, simplify by ADDING the exponents of each variable."
Here's what that looks like in this case:
First multiply the coefficients: 
Then ADD the exponents of the variables to simplify. In the first term, the exponent on the 
is 2. In the second term the exponent is 1. So we ADD 
and have 
.
Only the second term has the variable 
and its exponent is 5. There is nothing to add onto that (because there are no 
's in the first term), so it stays 
.
Remember, this is all being multiplied together, so the final answer is 
In the last few problems, we saw one way to multiply terms with exponents.
Another way to explain what we did is to say: "When you MULTIPLY terms together, simplify by ADDING the exponents of each variable."
Here's what that looks like in this case:
First multiply the coefficients:
Then ADD the exponents of the variables to simplify. In the first term, the exponent on the
Only the second term has the variable
Remember, this is all being multiplied together, so the final answer is
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Simplify the following expression:
Simplify the following expression:
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Remember the rule:
"When you MULTIPLY terms together, simplify by ADDING the exponents of each variable."
Here's what that looks like in this case:
First multiply the coefficients: 
Then ADD the exponents of the variables to simplify. In the first term, the exponent on the 
is 2. In the second term the exponent is 1. So we ADD 
and just have 
.
In the first term, the exponent on the 
is 3. In the second term the exponent is 6. So we ADD 
and just have 
.
In the first term, the exponent on the 
is 2. In the second term the exponent is 2. So we ADD 
and just have 
.
Remember, all these parts are being multiplied together, so the final answer is 
Remember the rule:
"When you MULTIPLY terms together, simplify by ADDING the exponents of each variable."
Here's what that looks like in this case:
First multiply the coefficients:
Then ADD the exponents of the variables to simplify. In the first term, the exponent on the
In the first term, the exponent on the
In the first term, the exponent on the
Remember, all these parts are being multiplied together, so the final answer is
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Simplify:
Simplify:
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Which of the following is equal to 
?
Which of the following is equal to
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Remember that when multiplying variables with exponents, the following property holds true:
With this knowledge, we can solve the problem:
The answer is 
.
Remember that when multiplying variables with exponents, the following property holds true:
With this knowledge, we can solve the problem:
The answer is
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