In Exercises 59–94, solve each absolute value inequality. |2(x...

Question

In Exercises 59–94, solve each absolute value inequality. |2(x - 1) + 4| ≤ 8

Accepted Answer

Hello everyone in this video we're going to be looking at this practice problem where we want to simplify the absolute value inequality, absolute value of three times parentheses X plus two and parentheses plus five less than or equal to 11. And we want to express the solution set in interval notation. So in order to find the solution set for this inequality we need to solve for X. But because there's an absolute value let's recall that an absolute value. Say we take the absolute value of a number such as a we get a back. So in this case the absolute value didn't affect the value of a. However if we take the absolute value of a negative number we also get a back. So from here you can see that there's two possible scenarios in absolute values. We could get a we could have a positive number or a negative number inside the absolute values but it gives us the same result. So we want to keep this in mind when we're solving our inequality. So the first thing I'm gonna do is simplify the inside of the absolute value. So I have three times X. Plus two plus five and I'm just gonna write the absolute value and simplify it and then I'll go back in and out of my right hand side of the inequality. So in this case you can see I have this parentheses so I want to make sure to distribute this three to the components inside the parentheses. So if I do that I have three times X. So three X Plus three times six plus this five and I can combine the six and the five. So I'm left with three X plus 11 and I still have the absolute value bars and now I'm going to go ahead and bring back my right hand side Less than or equal to 11. So from here we can think about this absolute value as being either a positive number or a negative number. So if we think of it as a positive number we have positive three x plus 11 Less than or equal to 11. So notice I got rid of the absolute value bars. Now I just have a positive one in front of the components star were in absolute value. So I'm going to do the same. So say there's a negative coefficient in front of the values inside of the absolute value. So now I have negative three x plus less than or equal to 11. And these two scenarios represent first this first one here if the number inside the absolute value is positive and the second one if the number inside the absolute value U. Was negative. So I'm gonna go ahead and solve this for X. So I do this I have three X plus 11 less than or equal to 11. I'll subtract 11 from both sides. So it leaves me with three X less than or equal to zero. If I divide by three I got x less than or equal to zero because 0 divided by three is 0. So that's my first range. If I look at this second inequality that I need to solve we have this negative out front. So in order to start simplifying I'm going to go ahead and divide by -1. And because I'm dividing a negative number across the inequality, the inequality switches direction. So instead of being less than and equal to it's greater than or equal to and my left hand side becomes three X plus 11. And my right hand side is now negative 11. I can start to simplify I'll subtract 11 from both sides. So I'm left with three x is greater than or equal to negative 11 minus negative 11 is negative 22. And if I divide by three my final interval is X is greater than or equal to negative 22 3rd. So in order to help me visualize this, I'm going to draw a number line, We'll call this zero And I'll say that this is -22/3. So if I look at my first General X less than or equal to zero because it has the equal to I know that I need a bracket on the zero and because X needs to be less than zero, I will be going to the left And if I look at my second interval x greater than or equal to negative 22/ again another bracket because I have an equal to and now X is greater than which means I have to go to the right. And my solution set is where those two intervals overlap. And we can see that it's right here between negative 22/3 and zero. So if I write that in interval notation again, my lower bound will have a bracket because I have an equal to sign and It's negative 22/ All the way up to zero, and again another bracket. So this becomes my final answer for the solution set in interval notation. And you can see that that aligns with answer choice A. So hopefully this video helped and see you next time.

In Exercises 59–94, solve each absolute value inequality. |2(x - 1) + 4| ≤ 8

Key Concepts

Absolute Value Inequalities

Distributive Property

Solving Linear Inequalities

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