Solve each inequality. Give the solution set in interval notat...

Question

Solve each inequality. Give the solution set in interval notation.

$∣ 5 - 3 x ∣ \leq 7$

Accepted Answer

Hello everyone in this video we're going to be looking at this practice problem where we want to find the solution set for the inequality absolute value of 1 - x less than or equal to 37. So in this case we're working with an inequality that has an absolute value. So we want to think about what the absolute value Means in terms of the components inside of it, which in this case is 1 -2 x. So 1 -2 x could truly be positive. In that case we'd have 1 -2 x less than or equal to 37 But 1 -2 x could also be negative. Because recall that the absolute value turns any negative number positive which means that 1 -2X could be negative and still give us the same result as positive. But in order to solve and find the solution set for this inequality we need to consider both of these scenarios. So I'll get started for if one minus two X was positive. And in order to find the solution set, I need to isolate X because I'm trying to find all the values of X that make these inequalities true. So I'll start by subtracting one from both sides. So I have negative two X less than or equal to 37 minus one is 36. Then I'll divide by negative two. And because I'm dividing a negative across the inequality it changes directions from less than or equal to two greater than or equal to. So it leaves me with X is greater than or equal to divided by -2 which is negative 18. So that solves my inequality for if the components inside the absolute value were positive. Now I want to take a look if they were negative, so if they were negative, I have this negative one that I can distribute to the inside of the parentheses. So negative one times positive one is negative one and negative one times negative two, X is positive two. X. And I still have the less than or equal to 37. And in order to isolate X, I'll start by adding one to both sides. So it leaves me with two. X is less than or equal to 37 plus one is 38 all divide by two. So that means X is less than or equal to 38 divided by two which is 19. And now I have both of my inequality solved. And in order to change them into interval notation, I'm going to draw a number line to help me visualize these inequalities. So I'll say this is zero, this is negative 18 and this is positive 19. So if I look at my first interval, I have X is greater than or equal to negative negative 18. So because X is greater than negative 18, negative 18 is a lower boundary. And because I have that equal to I need to draw a bracket. So X is greater then -18. Soldier. All line going to the right. And for my second inequality I have X is less than or equal to 19. So again I have that equal to but now X is less than 19, so 19 is a upper boundary and X is going to be less than So I'll draw a line going to the left and now in this number line I want to find the solution set where the inequalities overlap. So you can see that the lines overlap in this section between -18 and positive 19. So I need to write that as my interval Because between -18 and positive 19, the values of X make both of these inequalities true. So this interval would be my solution set. So you can see in the interval my lower boundary is negative 18 And it goes from -18 to positive 19. So all values of X in this interval make my inequalities true. So this becomes my final answer for the solution set for this inequality. And you can see that answer choice B also has bracket negative 18 to positive 19 bracket. So hopefully this video helped and see you next time

Solve each inequality. Give the solution set in interval notation.
$∣ 5 - 3 x ∣ \leq 7$

Key Concepts

Absolute Value Inequalities

Solving Linear Inequalities

Interval Notation

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