Rational Exponents - College Algebra
Card 1 of 52
Simplify: 
Simplify:
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An option to solve this is to split up the fraction. Rewrite the fractional exponent as follows:
A value to its half power is the square root of that value.
Substitute this value back into 
.
An option to solve this is to split up the fraction. Rewrite the fractional exponent as follows:
A value to its half power is the square root of that value.
Substitute this value back into
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Which of the following is equivalent to 
?
Which of the following is equivalent to
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Which of the following is equivalent to 
?
When dealing with fractional exponents, keep the following in mind: The numerator is making the base bigger, so treat it like a regular exponent. The denominator is making the base smaller, so it must be the root you are taking.
This means that 
is equal to the fifth root of b to the fourth. Perhaps a bit confusing, but it means that we will keep 
, but put the whole thing under
.
So if we put it together we get:
Which of the following is equivalent to
When dealing with fractional exponents, keep the following in mind: The numerator is making the base bigger, so treat it like a regular exponent. The denominator is making the base smaller, so it must be the root you are taking.
This means that
So if we put it together we get:
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Evaluate 
Evaluate
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When dealing with fractional exponents, remember this form:
is the index of the radical which is also the denominator of the fraction, 
represents the base of the exponent, and 
is the power the base is raised to. That value is the numerator of the fraction.
With a negative exponent, we need to remember this form:
represents the base of the exponent, and 
is the power in a positive value.
When dealing with fractional exponents, remember this form:
With a negative exponent, we need to remember this form:
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First, distribute the exponent to both the numerator and denominator of the fraction.
The numerator of a fractional exponent is the power you take the number to and the denominator is the root that you take the number to.
You can take the cubed root and square the numbers in either order but if you can do the root first that is often easier.
This is the answer. Alternatively, you could have squared the numbers first before taking the cubed root.
First, distribute the exponent to both the numerator and denominator of the fraction.
The numerator of a fractional exponent is the power you take the number to and the denominator is the root that you take the number to.
You can take the cubed root and square the numbers in either order but if you can do the root first that is often easier.
This is the answer. Alternatively, you could have squared the numbers first before taking the cubed root.
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Evaluate:
Evaluate:
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In order to evaluate fractional exponents, we can express them using the following relationship:
In this formula, 
represents the index of the radical from the denominator of the fraction and 
is the exponent that raises the base: 
. When exponents are negative, we can express them using the following relationship:
We can then rewrite and solve the expression in the following way.
Dividing by a fraction is the same as multiplying by its reciprocal.
In order to evaluate fractional exponents, we can express them using the following relationship:
In this formula,
We can then rewrite and solve the expression in the following way.
Dividing by a fraction is the same as multiplying by its reciprocal.
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Evaluate.
Evaluate.
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Exponents raised to a power of <1 can be written as the root of the denominator.
So:
Recall that a square root can give two answers, one positive and one negative.
Exponents raised to a power of <1 can be written as the root of the denominator.
So:
Recall that a square root can give two answers, one positive and one negative.
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Evaluate
Evaluate
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The denominator of the exponent "N" is the same as the "N" root of that number.
So
The denominator of the exponent "N" is the same as the "N" root of that number.
So
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Evaluate
Evaluate
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This appears more complicated than it is.
is really just 
where
and
Re-written this equation looks like
This appears more complicated than it is.
and
Re-written this equation looks like
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Evaluate
Evaluate
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can be seen as 
, in a scientific calculator use the 
button where 
.
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Evaluate the given rational exponent:
Evaluate the given rational exponent:
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Rational exponents can be simplified by following this common rule:
We can apply this concept to the given value in order to evaluate:
Rational exponents can be simplified by following this common rule:
We can apply this concept to the given value in order to evaluate:
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Solve for 
:
Solve for
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We can use the given property of rational exponents to solve for 
:
We can use the given property of rational exponents to solve for
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Solve for 
:
Solve for
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We can use the given property of rational exponents to solve for 
:
We can use the given property of rational exponents to solve for
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Evaluate: 
Evaluate:
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Step 1: We need to understand what the fractional value in the exponent is.
A fractional exponent, 
, tells us that we must take the 
th root of the number.
In this case, we have 
, so we will take the 4th root of 
.
Step 2: Calculate...
The answer is 
.
Step 1: We need to understand what the fractional value in the exponent is.
A fractional exponent,
In this case, we have
Step 2: Calculate...
The answer is
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Simplify:
Simplify:
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An option to solve this is to split up the fraction. Rewrite the fractional exponent as follows:
A value to its half power is the square root of that value.
Substitute this value back into .
An option to solve this is to split up the fraction. Rewrite the fractional exponent as follows:
A value to its half power is the square root of that value.
Substitute this value back into
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Which of the following is equivalent to ?
Which of the following is equivalent to
Tap to reveal answer
Which of the following is equivalent to ?
When dealing with fractional exponents, keep the following in mind: The numerator is making the base bigger, so treat it like a regular exponent. The denominator is making the base smaller, so it must be the root you are taking.
This means that is equal to the fifth root of b to the fourth. Perhaps a bit confusing, but it means that we will keep , but put the whole thing under.
So if we put it together we get:
Which of the following is equivalent to
When dealing with fractional exponents, keep the following in mind: The numerator is making the base bigger, so treat it like a regular exponent. The denominator is making the base smaller, so it must be the root you are taking.
This means that
So if we put it together we get:
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Evaluate
Evaluate
Tap to reveal answer
When dealing with fractional exponents, remember this form:
is the index of the radical which is also the denominator of the fraction, represents the base of the exponent, and is the power the base is raised to. That value is the numerator of the fraction.
With a negative exponent, we need to remember this form:
represents the base of the exponent, and is the power in a positive value.
When dealing with fractional exponents, remember this form:
With a negative exponent, we need to remember this form:
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Tap to reveal answer
First, distribute the exponent to both the numerator and denominator of the fraction.
The numerator of a fractional exponent is the power you take the number to and the denominator is the root that you take the number to.
You can take the cubed root and square the numbers in either order but if you can do the root first that is often easier.
This is the answer. Alternatively, you could have squared the numbers first before taking the cubed root.
First, distribute the exponent to both the numerator and denominator of the fraction.
The numerator of a fractional exponent is the power you take the number to and the denominator is the root that you take the number to.
You can take the cubed root and square the numbers in either order but if you can do the root first that is often easier.
This is the answer. Alternatively, you could have squared the numbers first before taking the cubed root.
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Evaluate:
Evaluate:
Tap to reveal answer
In order to evaluate fractional exponents, we can express them using the following relationship:
In this formula, represents the index of the radical from the denominator of the fraction and is the exponent that raises the base: . When exponents are negative, we can express them using the following relationship:
We can then rewrite and solve the expression in the following way.
Dividing by a fraction is the same as multiplying by its reciprocal.
In order to evaluate fractional exponents, we can express them using the following relationship:
In this formula,
We can then rewrite and solve the expression in the following way.
Dividing by a fraction is the same as multiplying by its reciprocal.
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Evaluate.
Evaluate.
Tap to reveal answer
Exponents raised to a power of <1 can be written as the root of the denominator.
So:
Recall that a square root can give two answers, one positive and one negative.
Exponents raised to a power of <1 can be written as the root of the denominator.
So:
Recall that a square root can give two answers, one positive and one negative.
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Evaluate
Evaluate
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The denominator of the exponent "N" is the same as the "N" root of that number.
So
The denominator of the exponent "N" is the same as the "N" root of that number.
So
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