Solve each inequality. Give the solution set using interval no...

Question

Solve each inequality. Give the solution set using interval notation. 3/x+2 > 2/x-4

Accepted Answer

Hello, everyone. In this video, we're going to be looking at this practice problem which states find the solution set of the following inequality and express it in interval notation. And the inequality is 11 over X plus seven is greater than five over X minus two. And were given four answer choices A B C and D and all of the answer choices seem to be intervals with C and D having union Between two intervals A&B being standalone intervals. So to figure out which of these answer choices is correct, let's take a look at our Inequality which is 11 over X Plus seven is greater than five over X -2. So in order to solve this inequality, we want to solve for X and in this case, we have X on both the left hand side and the right hand side. So I'm going to move all the terms to the left hand side by subtracting By five over X -2 on both sides. So if I do that, my left hand side is now 11 over X plus seven -5 over X -2 is greater than zero. And now I want to combine these two fractions, which means that I need a common denominator in these fractions. So I need to multiply by 11, I need to multiply 11 over X plus seven by X minus two over X minus two. And I need to multiply five over X minus two by X plus seven over X plus seven. So when I do that, my first fraction becomes 11 multiplied by X minus two with a denominator of X plus seven, Multiplied by X -2. My second fraction becomes five multiplied by X plus seven Over X-plus seven multiplied by X -2. And this is still greater than zero. So now you can see that I have a common denominator so I can combine my two fractions. So this becomes first, I can multiply the cell. So I have 11 multiplied by X which is 11 X multiplied by negative two, which is negative 22 minus five, multiplied by X is five x and five, multiplied by seven is 35. And this is now over the common denominator of X Plus seven multiplied by X -2, greater than zero. So if I work on simplifying my numerator further, I have I'm going to distribute this negative. So negative times five X is negative five X and negative times positive is negative 35. So we can bring them out of this parenthesis. And now I can combine like terms. So I have 11, X minus five, X is six X and negative 22 minus 35 is negative over X-plus seven multiplied by X -2 better than zero. And from here, I'm going to solve for X in the numerator and in the denominator starting with the numerator, I have six X -57 is equal to zero, adding 57 to both sides to isolate X Left with six, X is equal to 57 to completely isolate X. I'm going to divide by six. So I have X is equal to 57/6, which I can simplify to 19/2. So when I saw for my numerator, I get X is equal to 19 over two. And now looking at the denominator, we're going to have two solutions because I have X plus seven equals zero. So if I solve for X by subtracting seven, I have X is equal to negative seven and then we have X minus two is equal to zero. When I solve for X, I have X is equal to positive two. So my two solutions are X equals negative seven and X equals two. And normally this would be my solutions because we have X equals a number. But because we have inequality, we have to treat these as points that tell us certain intervals to look at. So if I draw the number line and call it the X axis, And I'll draw take here and I'll say that's -7. I'll say this tick here is too. And my last tick will be up here representing 19/2. So notice these are all the solutions that I found for X. But these are also the intervals that I need to test. So the first interval is from negative infinity to negative seven. The second interval is from negative seven to positive to the third interval is from 2 to 19/2. And my last interval is from 19/2 to positive infinity. So I need to test values in each of these intervals and see if they make my inequality true. So I'm going to start with the first interval which is negative infinity to negative seven. And I'm going to test X equals negative eight. So when I plug in negative eight into my inequality, I have six multiplied by negative 8 -57 divided by negative eight Plus seven multiplied by negative eight minus two. It is greater than zero. So once I start to simplify this six multiplied by negative eight is negative 48 minus 57. Over negative eight plus seven is negative one, negative eight minus two is negative 10, greater than zero, negative 48 minus 57 is -100 five And then negative one Multiplied by -10 is positive 10. So in this case, my inequality says that negative 105 over 10 is greater than zero, which is not true. So I can ignore this interval or exclude this interval from my solution set. The second interval I will be testing is from negative 7 to 2. I'm going to plug in X equals zero. So I have six multiplied by zero minus 57/0 plus seven Multiplied by 0 -2 is greater than zero. So this becomes six times zero is zero. So my numerator is negative 57 divided by seven multiplied by -2, greater than zero. So I have negative 57 divided by or over seven times negative two, which is negative 14, 2 negatives make a positive. So I have positive 57/14 is greater than zero, which is true. So I can include this interval in my solution set. Next, we'll test the third interval which is from to 19 halfs and I'm going to test X equals three. So I have six, multiplied by three minus 57 divided by three plus seven, multiplied by three minus two, greater than 06 times three is minus 57. That's over three plus seven, just 10 and three minus two, which is one greater than 0 18 minus seven is equal to negative 39. So my final fraction is negative 39/10 is greater than zero, which is not true. So I can exclude this third interval. And the last interval is 19/ to positive infinity. And I'll be testing x equals 10. So I have six multiplied by 10 minus 57 over 10 plus seven, Multiplied by 10 -2, greater than zero six, multiplied by 10 is 60 -57. And that's over 10 plus seven, which is 17, multiplied by 10 -2, which is eight greater than zero, 60 minus 57 is three divided by 17/8, which is 136 is greater than zero. And we have a positive number being greater than zero, which is true. So I can include this interval in my solution. So if I go back to the number line I drew, I want to include the 2nd and 4th interval. The second interval would be between -7 & two. And the 4th interval would be from 19/2 to positive infinity. And notice that we have a greater than sign and not an equal to. So I know that all of my points can't be included or will be an open circle if I were to draw this on the number line. And if I write this in interval notation, I would have parentheses negative seven to positive too Union with 19/2ves to positive infinity. So this interval with the union becomes my final answer. And if we look at the answer choices, you can see that answer choice D also has the same Interval from -7 to positive to union with 19/2 to positive infinity. So hopefully this video helped and see you next time.

Solve each inequality. Give the solution set using interval notation. 3/x+2 > 2/x-4

Key Concepts

Solving Rational Inequalities

Finding Critical Points and Domain Restrictions

Interval Notation for Solution Sets

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