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McGraw Hill Glencoe Algebra 1, 2012

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McGraw Hill Glencoe Algebra 1, 2012 View details

Standardized Test Practice

Exercise 14 Page 331

Split the compound inequality into two separate inequalities.

Practice makes perfect

First, let's split the compound inequality into separate inequalities. Compound Inequality: 3x-6 ≤ 4x&-4 ≤ 3x+1 First Inequality: 3x-6 ≤ 4x&-4 Second Inequality: 4x&-4 ≤ 3x+1 Notice that compound inequalities written in this way are equivalent to compound inequalities that involve the word and. 3x-6 ≤ 4x-4 and 4x-4 ≤ 3x+1

Let's solve the inequalities separately.

First inequality

Inequalities can be solved in the same way as equations, by performing inverse operations on both sides until the variable is isolated. The only difference is that when you divide or multiply by a negative number, you must flip the inequality sign.

3x-6≤ 4x-4

LHS-3x≤RHS-3x

-6 ≤ x-4

LHS+4≤RHS+4

-2 ≤ x

Rearrange inequality

x ≥ -2

The first inequality is satisfied by all values greater than or equal to -2.

Second inequality

Once more, we will solve the inequality by isolating the variable.

4x-4≤3x+1

LHS-3x≤RHS-3x

x-4≤1

LHS+4≤RHS+4

x≤5

The second inequality is true for numbers less than or equal to 5.

Compound inequality

The solution set to the compound inequality is the intersection of the solution sets. First Solution Set: - 2≤ x& Second Solution Set: x&≤5 Intersecting Solution Set: - 2≤ x& ≤5 Finally, we will graph the solution set to the compound inequality on a number line.

Subchapter links

Multiple Choice p.330

Short Response/Gridded Response p.331

Extended Response p.331