All Algebra II Resources
Example Questions
Example Question #262 : Fractions
Solve:
Double negatives will simplify to a positive. Since there are four negative signs, the answer will become a positive.
Multiply the numerator with the numerator and the denominator with the denominator.
The answer is:
Example Question #1941 : Mathematical Relationships And Basic Graphs
Divide:
In order to divide this expression, we will need to convert both fractions to improper fractions.
Leaving the denominators the same, the numerator can be determined by multiplying the denominator with the whole number, and then add the numerator.
Change the sign to multiplication and take the reciprocal of the second term.
The answer is:
Example Question #261 : Fractions
Divide:
In order to simplify this, we will need to evaluate each complex fraction first.
Rewrite each complex fraction using a division sign, and then convert the division sign to a multiplication sign and take the reciprocal of the second term. This will avoid confusion while flipping the numerator and denominator.
Divide the two fractions.
Reduce the fraction.
The answer is:
Example Question #264 : Fractions
Solve:
In order to simplify this, we do not need to multiply the numerators and denominators. We can save calculation by eliminating the common terms.
We do not need common denominators to multiply.
Cancel the common twos and sevens. Rewrite the remaining terms.
The answer is:
Example Question #265 : Fractions
Divide the fractions:
We will need to solve each complex fraction first.
Rewrite the complex fractions using a division sign, change the sign to a multiplication sign, and then take the reciprocal of the second term.
Divide the two fractions.
Reduce this fraction.
The answer is:
Example Question #266 : Fractions
Divide the fractions:
Change the division sign to a multiplication and take the reciprocal of the second term.
Reduce the fractions instead of multiplying the numerator with numerator and denominator with denominator.
The answer is:
Example Question #267 : Fractions
Divide the fractions:
Simplify the complex fraction by using a division sign.
Change the sign to multiplication, and take the reciprocal of the second term.
Replace the term and repeat the process for the second fraction.
The answer is:
Example Question #268 : Fractions
Evaluate:
Evaluate each complex fraction. Rewrite each using the division sign and then use the reciprocal property of division to evaluate the expression.
Divide both fractions.
The answer is:
Example Question #4611 : Algebra Ii
Divide the fractions:
Reduce the first fraction.
Simplify the complex fraction by using first using a division sign to rewrite the terms. Convert the division sign to a multiplication sign and take the reciprocal of the second term.
Divide the fractions.
Simplify the fractions.
The answer is:
Example Question #271 : Fractions
Multiply the fractions:
We can multiply the numerators and denominators as is instead of dealing with each complex fraction.
Combine the terms as a complex fraction.
Rewrite this using a division sign, and then use the multiplication property of division to solve.
Reduce this fraction.
The answer is: