Expressing Radicals as Exponents
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Math › Expressing Radicals as Exponents
Convert the radical to exponential notation.
Explanation
Remember that any term outside the radical will be in the denominator of the exponent.
Since 
Which fraction is equivalent to 
Explanation
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
Choose the fraction equivalent to 
Explanation
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
Simplify:
Explanation
Multiply the numerator and denominator to the exponent:
Simplify the expression by combining like terms:
Express the following exponent in radical form:
Explanation
Begin by converting each exponent to have a denominator of 
Now, put this in radical form:
Finally, simplify:
Simplify the following radical expression using exponents. Express the final answer in radical form.
Explanation
Begin by converting the radical into exponent form:
Simplify the exponent and multiply:
Convert into radical form:
Simplify:
Express the following exponent in radical form:
Explanation
Begin by changing the fractional exponents so that they both have a common denominator of 
Now, put this in radical form and simplify:
Express the following radical in rational (exponential) form:
Explanation
To convert the radical to exponent form, begin by converting the integer:
Now, divide each exponent by 
Finally, simplify the exponents:
Express the following radical in rational (exponential) form:
Explanation
To convert the radical to exponent form, begin by converting the integer:
Now, divide each exponent by 
Finally, simplify the exponents:
Simplify the following radical. Express in rational (exponential) form.
Explanation
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
