Solve each polynomial inequality in Exercises 1–42 and graph t...

Question

Solve each polynomial inequality in Exercises 1–42 and graph the solution set on a real number line. Express each solution set in interval notation. 9x²+3x−2≥0

Accepted Answer

Hello today we're going to be solving the given polynomial inequality. So what we are given is two X squared plus x minus 15 is less than or equal to zero. Now, in order to start this process, we want to completely simplify the given polynomial two X squared plus x minus 15 is a factor of all. Tryin Amiel as this is going to factor into the quantities two x minus five times X plus three. Now that we have the polynomial simplified, we want to identify the zeros for X. And in order to do that, we're going to take each factor of X set equal to zero and sulfur X. So doing this is going to give us two. X minus five is equal to zero and X plus three is equal to zero on the left hand side. We're going to add five to both sides of the equation and that's going to give us two. X is equal to five. And in order to solve for X, we're gonna divide both sides by two and that's going to give us X is equal to 5/2, which is going to be the first zero for X. On the right hand side. We're going to subtract three to both sides of the equation and that's going to give us X is equal to negative three which is the final zero for X. Now that we have the zeros for X let's go ahead and plot them on a number line and this is going to give us the regions that we can test for to see which regions satisfied the given inequality. So this number line is going to start negative infinity and go to our first zero, which is negative three. That is going to go for negative 3 to 5/2 and 5/2 is equal to 2.5. And finally this number line is going to go from 5/2 and end with positive infinity. Now keep in mind that the original inequality is using less than or equal to since it's using less than or equal to, we're going to include the zeros in our solution set and we're going to represent that with solid dots on the number line. Now that we have the regions for X. We're going to take a testing point from each region, plug it into the original inequality and whichever one satisfies the original inequality is going to be included in our solution set. So let's test the region to the left of -3. And the testing point here can be when X is equal to negative four. When x is equal to negative four, we get two times negative four squared minus four minus 15, less than or equal to zero. Now, negative four squared is going to give us positive 16 and 16 times two is going to give us 32, -4 -15 is going to give us -19 and 32 -19 is going to give us 13 less than or equal to zero, which is a false inequality. So since this region didn't satisfy the inequality, we're not going to include any values to the left of -3. Now, let's pick a testing point between native three and 5/2. And this can be when X is equal to zero, When x is equal to zero, we get two times zero squared plus zero minus is less than equal to zero. Anything multiplied by zero is just going to be zero. So this term right here is going to evaluate to give us zero and what we are left with is zero plus zero minus 15, which is going to give us negative 15 less than equal to zero, which is a true inequality. So since this testing point satisfies the inequality, we're going to include the region between negative three and 5/2. Now, let's test the region to the right of 5/2. And this can be when X is equal to three. When x is equal to three, we get two times three squared plus three minus 15 is less than or equal to zero. Three squared is going to give us nine and nine times two is going to give us 18 plus three minus 15 is less than equal to zero. And adding the three values together is going to give us positive six, less than equal to zero, which is a false inequality. And since this region didn't satisfy the inequality, we're not going to include any values to the right of 5/2. Now that we've identified the values that satisfy the inequality, let's go ahead and represent our answer in interval notation. So the region that we identified starts at negative three and ends at 5/2. So we're going to write negative three. And since negative three has been included in our solution set, we're going to assign it a bracket. Then this region is going to end at positive 5/2. And since 5/2 has been included, we're going to assign it a bracket as well. And this is going to be the solution to the given inequality. And with that being said, the answer to this problem is going to be is going to be C. So I hope this video helps you in understanding how to approach this problem. And I'll go ahead and see you all in the next video.

Solve each polynomial inequality in Exercises 1–42 and graph the solution set on a real number line. Express each solution set in interval notation. 9x²+3x−2≥0

Key Concepts

Polynomial Inequalities

Factoring Quadratic Polynomials

Interval Notation and Number Line Graphing

Watch next

Solve each polynomial inequality in Exercises 1–42 and graph the solution set on a real number line. Express each solution set in interval notation. 9x2+3x−2≥0

Key Concepts

Polynomial Inequalities

Factoring Quadratic Polynomials

Interval Notation and Number Line Graphing

Watch next

Solve each polynomial inequality in Exercises 1–42 and graph the solution set on a real number line. Express each solution set in interval notation. 9x²+3x−2≥0