Math

QuestionSolve the compound inequality: 3(x4)<153(x-4)<15 or x+10>14x+10>14. What are the solution options?

Studdy Solution

STEP 1

Assumptions1. The given compound inequality is 3(x4)<153(x-4)<15 or x+10>14x+10>14. . We need to solve each inequality separately and then combine the solutions according to the 'or' operator.
3. The inequalities are linear, so the solution will be a range of values for xx.

STEP 2

First, let's solve the inequality (x4)<15(x-4)<15. We can start by distributing the on the left side.
x12<15x -12 <15

STEP 3

Next, we add12 to both sides of the inequality to isolate 3x3x on the left side.
3x12+12<15+123x -12 +12 <15 +123x<273x <27

STEP 4

Then, we divide both sides of the inequality by3 to solve for xx.
3x3<273\frac{3x}{3} < \frac{27}{3}x<9x <9

STEP 5

Now, let's solve the second inequality x+10>14x+10>14. We start by subtracting10 from both sides to isolate xx.
x+1010>1410x +10 -10 >14 -10x>4x >4

STEP 6

Since the original compound inequality is connected by 'or', the solution is the union of the solutions of the two inequalities. This means that xx can be any value that satisfies either x<9x <9 or x>4x >4.
So, the solution is all real numbers less than9 or greater than4.
Looking at the given choices, the correct choice is not listed. The correct solution should be x<9x <9 or x>4x >4.

Was this helpful?

Studdy solves anything!

banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord