Solve each polynomial inequality. Give the solution set in interv...

Question

Solve each polynomial inequality. Give the solution set in interval notation. See Examples 2 and 3. (x + 3)^3(2x - 1)(x + 4) ≥ 0

Accepted Answer

Hello, everyone. In this video, we're gonna be looking at this practice problem which states for the given inequality expression solving, write the solution set in interval notation. And the inequality is X plus seven to the third multiplied by three, X minus two, multiplied by X plus 11 greater than or equal to zero. And we're given four answer choices for this practice problem answers A B and C are intervals unioned with either another interval or a number. And answer choice D is no solution. So in order to figure out which of these answers is correct, let's take a look at our inequality where we have X plus seven to the third multiplied by three, X minus two, multiplied by X plus 11 greater than or equal to zero. And in this case, when we want to find the solution set of an inequality, we want to solve for X while in this expression, X's are already factored. So we can sulfur X directly where we have X plus seven to the third. And I'm gonna set them equal to zero because that's what's on the right hand side of the inequality. And then I have three X minus two is equal to zero as well as X plus 11 equal to zero. So starting with my first term X plus seven to the third, I'm gonna take the cubed root of both sides. Leaving me with X plus seven is equal to zero. So I'm gonna subtract seven from both sides. So it leaves me with X is equal to negative seven. And my second term three X minus two, I'm gonna add two to both sides. So he's new with three, X is equal to two, dividing by three, I got x is equal to 2/3. And lastly X plus 11 equals one. I'm gonna subtract 11 from both sides leaving me with X is equal to negative 11. So normally if this was an equation, these would be my solutions. But because I have an inequality, these become the points for intervals that I need to test. So if I go in numerical order, my first interval would be from negative infinity to negative 11. My second interval would be from negative 11 to negative seven. And lastly, I would have an interval from negative 7 to 2 thirds or by the last one would be two thirds to positive infinity. So this covers all the values of X with certain intervals at the solutions for X. So I need to test values of X in each of these intervals. So if I start with negative infinity to negative 11, I can test the value at x equals -12. So I plug that into my expression and make sure that my inequality is true in this interval. So I have negative 12 plus seven to the third multiplied by three multiplied by negative 12 minus two, multiplied by negative 12 plus 11. That needs to be greater than or equal to zero. Negative 12 plus seven is negative five to the third multiplied by three multiplied by negative 12. So three times negative 12 is negative 36 minus two is negative 38. Then I have negative 12 plus 11 is negative one And this is greater than or equal to zero. Well, in this case, negative five to the third means I have a negative to an odd power which is gonna give me a negative number. Then I have negative 38 which is a negative number and negative one which is a negative number. So because I have three negatives, my end result will be negative. So this expression is saying that a negative number will be greater than or equal to zero, which is not true. So I can exclude this interval from my solution set. And looking at the next interval from negative 11 to negative seven, I can test the value at X equals negative 10. So I have negative 10 plus seven to the third multiplied by three, multiplied by negative 10 -2, multiplied by negative 10 plus 11 greater than or equal. To zero. So negative 10 plus seven is gonna give me negative three to the third multiplied by three Times -10, which is negative 30 -2 is negative Multiplied by negative 10 plus 11 which is one. So now I have a negative number multiplied by a negative number multiplied by a positive number. So because I have two negatives, my end number will end up being positive. And this is saying that a positive number is greater than or equal to zero, which is true. So I can include the interval negative 11 to negative seven. And I wanna test the other intervals. So I have negative 7-2 3rd and I can test the value at X equals zero. So I have zero plus seven to the third multiplied by three, multiplied by zero minus two, multiplied by zero plus 11. This needs to be greater than or equal to zero. Zero plus seven is seven to the third multiplied by three times zero, which is zero minus two, you meet with negative two and zero plus 11 which is greater than or equal to zero. And in this case, seven to the third is gonna be positive, negative two is negative and 11 is positive. So because I have one negative, my expression is gonna evaluate to negative. This is saying that a negative number is greater than or equal to zero, which is not true. So I can exclude this interval from my solution set. And the next interval I need to test is from 2/3 to positive infinity, which I'm going to test X at X equals one. So if I plug in X equals one, I have one plus seven To the third power multiplied by three times 1 - mortal by -1 plus Or not negative one, but one plus 11 greater than, or equal to zero. So I have eight to the third multiplied by 3 -2, which is one multiplied by one plus 11, which is 12 greater than or equal to zero. So I have a positive number multiplied by a positive number and another positive number. So because I have only positive numbers, this inequality will be greater than or equal to zero. So I can include this interval in my solution set. So now I know now I tested all the intervals and I found the intervals that satisfied my inequality. But now I need to check if the end points of those intervals need to be included in my solution set. So if I start with XX equals negative 11, I'm gonna plug in negative 11 into my inequality. So I have negative 11 plus seven to the third multiplied by three, multiplied by negative 11 -2, multiplied by negative 11 plus 11 greater than or equal to zero. Well, in this case, negative 11 plus 11 is equal to zero, which means that this whole expression will be equal to zero And zero is greater than or equal to zero. So I can include x equals negative 11. In my solution set. The next endpoint I need to test is X equals negative seven. So when I plug in X equals negative seven, I have negative seven plus seven to the third multiplied by three times negative seven minus two, multiplied by negative seven plus 11. And in this case, this first term evaluates to zero, which means that this whole expression will also evaluate to zero. And once again, zero is greater than or equal to zero. So I can include X equals negative seven in my solution set. And the last value earning to test is x equals 2/3. So if I test x equals 2/3 I have two thirds plus seven to the third multiplied by three times two thirds minus two multiplied by two thirds plus 11. While in this case, this middle term we have three multiplied by two thirds, which is two -2, which evaluates 20, which means this whole expression once again evaluates to zero and zero is greater than or equal to zero. So I can include X equals two thirds in my solution set. So that means I get to include all of my and points. So if I write intervals and interval notation, making sure to include my end points, I have bracket negative 11, 2, negative seven Union with Bracket 2/3 to Infinity. And this becomes my final answer for this practice problem. And you can see that, that aligns with answer choice C So hopefully this video helped and see you next time.

Solve each polynomial inequality. Give the solution set in interval notation. See Examples 2 and 3. (x + 3)^3(2x - 1)(x + 4) ≥ 0

Key Concepts

Polynomial Inequalities

Interval Notation

Sign Analysis

Watch next