All High School Math Resources
Example Questions
Example Question #13 : Using Expressions With Complex Numbers
Simplify the following complex number expression:
Use the FOIL (First, Outer, Inner, Last) method to expand the expression:
Simplify. Remember that is equivalent to .
Example Question #1 : Understanding Square Roots
Simplify the expression. Find the positive solution only.
When working in square roots, each component can be treated separately.
Now, we can simplify each term.
Combine the simplified terms to find the answer. Anything outside of the square root is combined, while anything under the root is combined under the root.
Example Question #1 : Understanding Radicals
Convert the radical to exponential notation.
Remember that any term outside the radical will be in the denominator of the exponent.
Since does not have any roots, we are simply raising it to the one-fourth power.
Example Question #2 : Expressing Radicals As Exponents
What is the value of ?
2.41
27
243
9
3
243
An exponent written as a fraction can be rewritten using roots. can be reqritten as . The bottom number on the fraction becomes the root, and the top becomes the exponent you raise the number to. is the same as . This will give us the answer of 243.
Example Question #1 : Expressing Radicals As Exponents
Express the following radical in rational (exponential) form:
To convert the radical to exponent form, begin by converting the integer:
Now, divide each exponent by to clear the square root:
Finally, simplify the exponents:
Example Question #1 : Understanding Radicals
Express the following radical in rational (exponential) form:
To convert the radical to exponent form, begin by converting the integer:
Now, divide each exponent by to cancel the radical:
Finally, simplify the exponents:
Example Question #4 : Understanding Radicals
Which fraction is equivalent to ?
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
Example Question #1 : Expressing Radicals As Exponents
Simplify the following radical. Express in rational (exponential) form.
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
Example Question #5 : Expressing Radicals As Exponents
Choose the fraction equivalent to .
Multiply the numerator and denominator by the compliment of the denominator:
Simplify the expression:
Example Question #5 : Understanding Radicals
Simplify the following radical. Express in rational (exponential) form.
Multiply the numerator and denominator to the exponent:
Simplify the expression by combining like terms:
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