Exercise 57 Page 47

Try to rewrite this inequality as a compound inequality.

Solution Set: -6 ≤ x ≤ 8 23
Graph:

Practice makes perfect

Before we can solve this inequality, we need to isolate the absolute value expression using the Subtraction Property of Inequality.

|3x-4|+5 ≤ 27

SubIneq

LHS-5≤RHS-5

|3x-4| ≤ 22

We are asked to find and graph the solution set for all possible values of x in the given inequality. |3x-4| ≤ 22

To do this, we will create a compound inequality by removing the absolute value. In this case, the solution set is any number less than or equal to 22 away from the midpoint in the positive direction and any number less than or equal to 22 away from the midpoint in the negative direction. Absolute Value Inequality:& |3x-4| ≤ 22 Compound Inequality:& - 22≤ 3x-4 ≤ 22 We can split this compound inequality into two cases, one where 3x-4 is greater than or equal to -22 and one where 3x-4 is less than or equal to 22. - 22≤3x-4 and 3x-4≤ 22 Let's isolate x in both of these cases before graphing the solution set.

Case 1

3x-4≤22

AddIneq

LHS+4≤RHS+4

3x ≤ 26

DivIneq

.LHS /3.≤.RHS /3.

x ≤26/3

▼

Simplify left-hand side

Rewrite

Rewrite 26 as 24+2

x≤24+2/3

WriteSumFrac

Write as a sum of fractions

x≤24/3+2/3

CalcQuot

Calculate quotient

x≤ 8+2/3

AddTerms

Add terms

x≤ 8 23

This inequality tells us that all values less than or equal to 8 23 will satisfy the inequality.

Case 2

- 22≤ 3x-4

AddIneq

LHS+4≤RHS+4

- 18 ≤ 3x

DivIneq

.LHS /3.≤.RHS /3.

-6 ≤ x

RearrangeEqn

Rearrange equation

x ≥ -6

This inequality tells us that all values greater than or equal to -6 will satisfy the inequality.

Solution Set

The solution to this type of compound inequality is the overlap of the solution sets. Let's recombine our cases back into one compound inequality. First Solution Set:& x ≤ 8 23 Second Solution Set:& -6 ≤ x Intersecting Solution Set:& -6 ≤ x ≤ 8 23