Operations with Radicals
Operations with Radicals
Just like working with variables, you can add, subtract, multiply, and divide expressions containing radicals (like square roots). The key is understanding the rules for combining them and knowing how to simplify your final answer.
Adding and Subtracting Radicals
You can only add or subtract like radicalsâradicals that have the exact same index (root type) and radicand (the number inside the root).
Think of it like combining like terms in algebra: just as 2x+3x=5x, you can say 25â+35â=55â.
Sometimes, you need to simplify the radicals first to see if they are alike.
Example: Simplify 32â+8â
Since 8â=4â 2â=22â, the expression becomes: 32â+22â=52â
Multiplying Radicals
When multiplying radicals, you multiply the numbers outside the radical together, and the numbers inside the radical together: abââ cdâ=acbdâ.
If you have binomials with radicals, you can use the FOIL method, or simplify the terms inside the parentheses first to make the math much easier.
Example: Simplify (32â+8â)(2ââ18â)
First, simplify the radicals inside the parentheses: 8â=22â 18â=9â 2â=32â
Substitute them back into the expression: (32â+22â)(2ââ32â)
Combine the like radicals inside each parenthesis: (52â)(â22â)
Now multiply the outside numbers and the inside numbers: 5â (â2)â 2â 2â=â10â 2=â20
Dividing and Rationalizing the Denominator
In math, it is standard practice not to leave a radical in the denominator of a fraction. The process of removing it is called rationalizing the denominator.
If the denominator is a binomial (has two terms) containing a square root, you eliminate the radical by multiplying both the numerator and the denominator by its conjugate. The conjugate of a+bâ is aâbâ.
Example: Simplify 3+5â4â
The denominator is 3+5â, so its conjugate is 3â5â. Multiply the top and bottom by this conjugate:
3+5â4ââ 3â5â3â5ââ
Distribute the numerator: 4(3â5â)=12â45â
Multiply the denominator using the difference of squares pattern (x+y)(xây)=x2ây2: (3)2â(5â)2=9â5=4
Put it all together and simplify the fraction: 412â45ââ=412ââ445ââ=3â5â