All Algebra II Resources
Example Questions
Example Question #11 : Solving Rational Expressions
Simplify:
First, simplify the expression before attempting to combine like-terms.
Combine like-terms.
Example Question #11 : Adding And Subtracting Rational Expressions
Simplify.
The question is simplified as is.
The question is simplified as is.
The values can only be added or subtracted if there are like-terms in the expression. Since there are no like-terms in the question, the question is already simplified as is. All the other answers given are incorrect.
Example Question #571 : Intermediate Single Variable Algebra
Simplify the rational expression:
There are multiple operations required in this problem. The exponent must be eliminated before distributing the negative sign. Use the FOIL method which means to mulitply the first terms together, then multiply the outer terms together, then multiply the inner terms togethers, and lastly, mulitply the last terms together.
The negative sign can now be distributed.
Example Question #12 : Adding And Subtracting Rational Expressions
First, find the common denominator, which is . Then, make sure to offset each numerator. Multiply by y to get . Multiply by x to get . Then, combine numerators to get . Then, put the numerator over the denominator to get your answer: .
Example Question #11 : Adding And Subtracting Rational Expressions
Subtract the expressions:
The answer is not present.
Make a common denominator:
Combine and subtract numerators:
Example Question #12 : Adding And Subtracting Rational Expressions
To start this problem, you must first identify the common denominator, which in this case is teh two denominators multiplied together: . Next, offset the numerators with the newly changed denominators: . Then, add numerators to get: . Put the numerator over your denominator and check to make sure it can't be simplified anymore (it can't). Your answer is: .
Example Question #13 : Adding And Subtracting Rational Expressions
To combine these rational expressions, first find the common denominator. In this case, it is . Then, offset the second equation so that you get the correct denominator: . Then, combine the numerators: . Put your numerator over the denominator for your answer: .
Example Question #581 : Intermediate Single Variable Algebra
Simplify:
First find the lowest common denominator. In this case, it will be x(x+2).
Multiply each fraction to get the common denominator then solve:
Example Question #19 : Solving Rational Expressions
Simplify:
To be able add or subtract the numerator, the denominators must be the same.
To get the same denominator, multiply both uncommon denominators together.
Convert both fractions to the like denominator.
For the numerator of the first term, expand the binomials.
Evaluate the numerator of the second term.
Rewrite the fractions.
To combine the numerators as one fraction, enclose the numerator of the second term in parentheses.
Simplify the numerator by distributing the negative sign and combine like-terms.
There are no similar common factors that will help reduce this expression any further.
The answer is:
Example Question #52 : Rational Expressions
Evaluate:
In order to solve this rational expression, denominators must be common.
Multiply both denominators together.
Convert the fractions with the same base denominator. Multiply the numerator with what was multiplied on the denominator to achieve the new denominator.
Combine the two fractions into a single fraction.
Simplify the numerator on the right side.
The answer is: