Download - Algebra 2 unit 6.3
UNIT 6.3 BINOMIAL RADICALUNIT 6.3 BINOMIAL RADICALEXPRESSIONSEXPRESSIONS
Warm Up
Simplify each expression.
1. 14x + 15y – 12y + x
2. 9xy + 2xy – 8xy
3. –3(a + b) +
15x + 3y
3xy
–3a – b + 10
Warm Up Continued
Simplify. All variables represent nonnegative numbers.
4.
5.
6.
Add and subtract radical expressions.
Objective
like radicals
Vocabulary
Square-root expressions with the same radicand are examples of like radicals.
Like radicals can be combined by adding or subtracting. You can use the Distributive Property to show how this is done:
Notice that you can combine like radicals by adding or subtracting the numbers multiplied by the radical and keeping the radical the same.
Combining like radicals is similar to combining like terms.
Helpful Hint
Example 1: Adding and Subtracting Square-Root Expressions
Add or subtract.
A.
The terms are like radicals.
B.
The terms are unlike radicals. Do not combine.
Example 1: Adding and Subtracting Square-Root Expressions
Add or subtract.
C.
D.
Identify like radicals.
Combine like radicals.
the terms are like radicals.
Check It Out! Example 1
Add or subtract.
The terms are like radicals.
a.
b.
The terms are like radicals.
Check It Out! Example 1
Add or subtract.
c.
The terms are like radicals.
d.
The terms are like radicals.
Combine like radicals.
Sometimes radicals do not appear to be like until they are simplified, Simplify all radicals in an expression before trying to identify like radicals.
Example 2A: Simplify Before Adding or Subtracting
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
Combine like radicals.
Example 2B: Simplify Before Adding or Subtracting
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
The terms are unlike radicals. Do not combine.
Example 2C: Simplify Before Adding or Subtracting
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
Combine like radicals.
When you write a radicand as a product, make at least one factor a perfect square.
Remember!
Check It Out! Example 2a
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
Combine like radicals.
Check It Out! Example 2b
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
The terms are unlike radicals. Do not combine.
Check It Out! Example 2c
Simplify each expression.
Factor the radicands using perfect squares.
Product Property of Square Roots.
Simplify.
Combine like radicals.
Example 3: Geometry Application
Find the perimeter of the triangle. Give the answer as a radical expression in simplest form.
Write an expression for perimeter.
Factor 20 using a perfect square.
Product Property of Square Roots.
Simplify.
Combine like radicals.
Check It Out! Example 3 Find the perimeter of a rectangle whose length is inches and whose width is inches. Give your answer as a radical expression in simplest form.
Write an expression for perimeter 2 (l + w).
Multiply each term by 2 .
Simplify.
The perimeter is in.
Combine like radicals.
Lesson Quiz: Part I
Add or subtract.
1.
2.
Simplify each expression.
3.
4.
5.
6. Find the perimeter of the trapezoid. Give the answer as a radical expression in simplest form.
Lesson Quiz: Part II
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