Question #c530c Algebra Linear Inequalities and Absolute Value Inequalities with Addition and Subtraction 1 Answer GiĆ³ Jan 28, 2017 Have a look: Explanation: We can collect #x# on one side: #x<=-8+3# #x<=-5# So that #x# can assume values that are smaller than #-5# and also #-5#. Answer link Related questions Does the inequality sign change when you are you subtracting? How do you solve inequalities with addition and subtraction? How do you solve inequalities with fractions? How do you solve #15 + g \ge -60#? How do you graph #x + 65 < 100#? How do you solve the inequality #5 + t \ge \frac{3}{4}#? How do you graph the inequality #x - 1 > -10# on a number line? Why do you not change the inequality sign when you are adding or subtracting? What's the result when you raise a number to the zero power? How do you solve #x+ 3 < 2#? See all questions in Inequalities with Addition and Subtraction Impact of this question 1285 views around the world You can reuse this answer Creative Commons License