Solve each rational inequality. Give the solution set in inter...

Question

Solve each rational inequality. Give the solution set in interval notation. (1-x)/(x+2)<-1

Accepted Answer

Hello, everyone. In this video, we're going to be looking at this practice problem which states solved the following inequality and express the answer in interval notation. And the inequality is nine minus X divided by X plus 12 is greater than negative one. And were given four answer choices for this problem. And all the answer choices seem to be intervals. And A and B you can see has have unions between two intervals will see and D our standalone interview intervals without a union. So to figure out which of these is right, let's go ahead and take a look at our inequality. So we have nine minus X divided by X plus 12 Greater than -1. So in this case to solve for X, I'm going to go ahead and move all the terms over to the left hand side, which means I'll add one to both sides. So my equation will become nine minus X divided by X plus 12 plus one greater than zero. And in order to combine my two terms on the left hand side, I'm going to rewrite one with a denominator of X plus 12. So if I do that one becomes X plus 12 divided by X plus 12. And now that my two terms have the same denominator, I can go ahead and add them. So this will become nine minus X plus X plus 12 divided by X plus 12. And from here, if I combine like terms on my numerator, I have negative X and positive X. So those cancel out. So I'm left with nine plus 12, which is equal to 21. So I'm left with 21 divided by X plus 12 and it's greater than zero. So from here, you may want to multiply X plus 12. But notice that if you do that, we cancel out X and we're left with 21 is greater than zero, which is in fact true, but it doesn't give us solutions for X. So in order to solve for X, we're going to solve for X in the denominator. So I have X plus 12 is greater than not greater than I'm going to set it equal 20. And in order to solve for X here, you can see, I get X is equal to negative 12. So this X is equal to negative 12 is not an actual solution for X. But it's going to tell me where I need to split up the numbers or the X axis into intervals. So based off of this, I have only one split and that's where X is equal to negative 12. So that means I'm going to test an interval from negative infinity to negative 12. And then again from negative 12 to positive infinity because I only get one value for x here. So I need to test these intervals and see in which of these intervals, my inequality is true. So if I test negative infinity to negative 12, I'm going to test it at x equals negative 13. So if I plug in negative 13 to my equation, I have 21 divided by negative 13 plus is greater than zero. And this becomes 21 divided by negative 12 plus 12 is negative one is greater than zero. So this is saying that -21 is greater than zero, which is not true. So I know that this interval Is not part of my solution set. And we can go ahead and test the next interval which is negative 12 to positive infinity. And I'll test it at X equals zero. So if I plug in zero for X, I got 21 divided by zero plus 12 is greater than zero. So this becomes 21 divided by is greater than zero. And this is in fact true. So I know that The interval negative to positive infinity is part of my solution set and I have no more intervals to test. So I know that negative 12 to positive infinity is my final solution set. And if we look at the answer choices you can see that answer choice C also has the same interval of negative 12 to positive infinity. So hopefully this already will help and see you next time.

Solve each rational inequality. Give the solution set in interval notation. (1-x)/(x+2)<-1

Key Concepts

Rational Inequalities

Critical Points and Sign Analysis

Interval Notation

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