Hey, everyone. We already know how to express sets in set notation, so something that looks like this, but there's actually a much more compact way to represent solution sets in what's called interval notation. Now you might be thinking, why do we need a new way to write sets if we already have one that works just fine? And not only is it going to be quicker and easier, but you're actually going to be asked explicitly to express your solutions to inequalities in interval notation. So, I'm going to show you how to take this set and turn it into something much more compact using parentheses and square brackets based on whether you have a less than sign or a less than or equal to sign. So let's go ahead and take a look here. There are different types of intervals you can have based on whether you're dealing with a less than or less than or equal to sign. So let's first look at our closed interval. So when I have a set like x≤0≤x≤5, because I have these less than or equal to inequality symbols, I am going to write my endpoints in between square brackets. Now you're also going to be asked to graph these intervals, and what that really means is just write your interval on a number line. So whenever I have square brackets on my interval, I'm going to express on my number points with closed circles. So I'm still going to label my endpoints here, and then I'm going to draw a line connecting my endpoints to show that my set or my interval includes everything from 0 all the way to 5, including 0 and 5. So whenever we're dealing with a less than or equal to sign, a square bracket, and a closed circle, that tells me that I'm dealing with a set with endpoints included because it's not just less than 5, it's less than or equal to 5. So let's take a look at our open interval here. So an open interval happens whenever I have something like x<0<x<5. Now you'll notice that these are not less than or equal to signs. They are just less than signs. And when I have that, I'm just going to take my endpoints and stick them in between parentheses. So when I have an open interval, those less than signs become parentheses in interval notation. Now whenever I'm asked to graph this, I'm going to take my parentheses and make them into open circles, still have my endpoints, and still connect my endpoints. But the open circles say to me that my endpoints are not included. They are excluded from my set. So anything I can have any number here from 0.0001 all the way up to 4.999. But I can't have 0 or 5 because they are not a part of my set. So that's an open interval. We can also have a combination of closed and open intervals. So let's take a look at that here. Here we have x≤0≤x<5. So you'll notice that the first symbol I have is that less than or equal to sign, which tells me that I need to enclose that first endpoint in a square bracket because it is included in my set. Now for my second inequality symbol, I just have a less than sign. So that tells me that my second endpoint is just going to be enclosed in parentheses. So that's my interval in interval notation when it is half-open half-closed. Let's go ahead and graph that as well. So whenever I have that square bracket and my endpoint is included, I want to make sure to have a closed circle there and still label my endpoint. And then with a parenthesis, I know that it's going to be an open circle. And then I need to fill in because it's all the way from 0, including 0, up to 5, but not including it. So that's how you express a half-closed, half-open circle. Let's take a look at one last example here. So here my set is x≥3. Now just looking at that, having that greater than or equal to sign tells me that I'm going to be dealing with a square bracket somewhere. But let's actually graph this first and see what's happening. So when I have a greater than or equal to, I know I'm going to be dealing with a closed circle. So I'm going to go ahead and plot my 3 with a closed circle. Now this is going to be fine all the way up until forever, up until infinity. So whenever we don't have an explicit endpoint, so here this just says x can be anything greater than or equal to 3 with no limit, I'm actually going to use infinity symbols to express this. So either a positive infinity or a negative infinity based on what direction it's going in. And whenever we have infinity in our intervals, we're going to treat this as an open bound because you can't get up to infinity. It goes on forever. Right? So it's not a hard endpoint. So to write this in interval notation, my 3 gets enclosed in a square bracket because it is included in my set but then I have infinity which just gets a parenthesis because that is not a hard endpoint. It's not less than or equal to infinity because you can't be equal to infinity. Right? So that's all there is to express sets in interval notation. Let's keep going.
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Linear Inequalities: Study with Video Lessons, Practice Problems & Examples
Understanding interval notation is essential for expressing solution sets compactly, especially for inequalities. Closed intervals use square brackets for endpoints included, while open intervals use parentheses for excluded endpoints. When solving linear inequalities, remember to flip the inequality sign when dividing by a negative number. Graphing these solutions involves using closed circles for included values and open circles for excluded ones. Expressing solutions in interval notation enhances clarity, allowing for effective communication of ranges, such as x is greater than or equal to 3, represented as [3, ∞).
Interval Notation
Video transcript
Express the given set in interval notation and graph.
{x | 14 ≤ x < 26}
(14,26)
[14,26]
[14, 26)
(14,26]
Express the given interval in set builder notation and graph. (−∞, 0]
{x∣x ≤ 0}
{x∣x < 0}
{x∣x > 0}
{x∣x≥0}
Express the given set in interval notation and graph.
{x ∣x≤7}
(−∞,7]
[−∞,7]
(−∞,7)
[7, ∞)
Linear Inequalities
Video transcript
Hey, everyone. So we've already learned how to solve linear equations like 2x − 6 = 0 by finding some value for x that we can plug back into our equation to make a true statement. But now you're going to start to see problems that instead of 2x − 6 = 0 have 2x − 6 ≤ 0. So there I have an inequality symbol instead of an equal sign and this is called a linear inequality. So linear inequalities are literally just linear equations but with an inequality symbol instead of an equal sign. Now I know what you're thinking, why are you taking something that I already know how to do and changing it? But don't worry, everything that we know about solving linear equations can be used to solve linear inequalities. We're just going to see a slightly different solution and I'm going to walk you through everything that you need to know about inequalities. So let's go ahead and get started. Like I said with linear equations, we were looking for some value of x and we could just move some numbers over and end up with a solution. Now let's go ahead and start solving our linear inequality the same exact way we did our linear equation. So if I have 2x − 6 ≤ 0, I can start by moving my 6 to the other side the same way I would with a linear equation. So if I just add 6 to both sides, that will cancel, leaving me with 2 x ≤ 6. Now that I'm here, I can isolate x by dividing by 2, again the same way I would with a linear equation. Canceling that 2 out and leaving me with x ≤ 3. So I actually still ended up with a 3 there. Now instead of being equal to 3 it is less than or equal to 3. So that's the difference that we're going to see here.
So let's take a look at one more inequality and just change something slightly. Here I had 2x − 6 ≤ 0 and over here I have -2x − 6 ≤ 0. So let's see what happens here. Well, I start the same way. I can go ahead and move my 6 over, leaving me with -2x ≤ 6. And now I need to go ahead and divide both sides by negative 2 to isolate it. So that will cancel, leaving me with x ≤ -3, and this is my solution. But if this is my solution, then that means that I should be able to plug any value that is less than or equal to negative 3 back into my original inequality and get a correct statement.
So let's see if that works here. So some number less than or equal to negative 3, if I try x = -4, that should work. So plugging that back into my original inequality, I have -2 × -4 − 6 ≤ 0. So -2 × -4 is positive 8, minus 6 is less than or equal to 0. 8 minus 6 is just 2, so 2 is less than or equal to 0. But 2 is definitely not less than or equal to 0, so something is wrong here and this actually is not my solution at all. So the reason why that's not my solution is because anytime that we'd multiply or divide by a negative number, I actually need to go ahead and flip my inequality symbol. So let's see what happens when we do that instead. So we're going to start again with this -2x ≤ 6. And then when I divide both sides by this negative 2, I'm still cancelling it out and left with x, but I'm going to take my inequality symbol and flip the direction it's facing. So instead of a less than or equal to sign, I'm going to use a greater than or equal to sign. And then I have 6 divided by negative 2, which gives me negative 3. So if this is my solution and this worked here, that means that any number greater than or equal to negative 3, I should be able to plug it. So if I take x = 0 and plug that in, that should hopefully work. Let's go ahead and give that a try. So -2 × 0 − 6 ≤ 0. -2 × 0 just goes away because anything times 0 is 0 and I'm left with negative 6 is less than or equal to 0. Now this is definitely a true statement. Negative 6 is less than or equal to 0. So this is my solution and x is greater than or equal to negative 3.
So let's talk about how we want to express these solutions. Well, whenever we were using doing linear equations, we just had one single value. We had something like x is equal to 3. So if I were to graph that, it would literally just be a single point on my graph because my solution is just a single value. But whenever we're dealing with linear inequalities, I don't have that x is equal to 0, I have that x is less than or equal to 0. And that's because I'm no longer dealing with a single value, but I am instead actually dealing with a whole range of values. So in order to graph that, I still have that same end point 3. And I know that since it's less than or equal to, that means I need to have a closed circle. So I'm going to draw a closed circle at my end point 3. And if x is anything less than or equal to 3, that means it could be anything to the left of that 3 all the way to negative infinity. And remember, we're also going to want to write these in interval notation. So in interval notation, remember that whenever we have an infinity it always gets a parenthesis. But should I enclose that 3 in a square bracket or parentheses? Well, again, since I have that less than or equal to sign, that means that 3 needs to get a square bracket because it is included in my interval. So let's look at our final example over here and rewrite our solution on a graph in interval notation. So since I have x is greater than or equal to negative 3, I still have my endpoint at negative 3 with a closed circle. Now since x can be anything greater than or equal to that negative 3, it's going to go all the way to the right up to infinity and forever. So if we write that in interval notation, my negative 3 is again going to get a square bracket here because I have a less than or equal to sign and not just a less than or a greater than sign. So then I have infinity which is of course going to get enclosed in parentheses and I'm done here. So that's all you need to know about solving linear inequalities. Let's get some more practice.
Solve the inequality. Express the solution set in interval notation and graph. 2x+12>19
(−∞,27)
(−∞,27]
[27,∞)
(27,∞)
Linear Inequalities with Fractions & Variables on Both Sides
Video transcript
Just as we saw happen with linear equations, sometimes linear inequalities will also have fractions, variables on both sides of the symbol, or maybe even both at the same time, but we're actually going to address them the exact same way we did with linear equations by getting rid of those fractions using the least common denominator and then getting all of our variables to one side. So let's go ahead and take a look at an example.
So here I have 14 times x plus 2 is greater than or equal to 112 minus 13x. Now the very first thing we want to do is get rid of those fractions, which we can do by multiplying the entire inequality by the least common denominator. Now I have 3 denominators here: 4, 12, and 3. So my least common denominator is going to be 12. So let's go ahead and multiply our entire inequality by 12. Remember that whenever we're multiplying by our least common denominator, we need to make sure to carry that into every single term in our equation or in this case, our inequality. So let's go ahead and expand this out.
So this becomes 124x plus 2 is greater than or equal to a negative 1212 and then carrying that 12 to our very last term −123x. Let's go ahead and simplify. So 124 is just 3, so this becomes 3 times x + 2 is greater than or equal to a negative 1. And then negative 123 is going to give me negative 4 times x. Okay.
Now we need to look at a couple of different things here. The first thing that we need to do from this point is to go ahead and distribute this 3. So I need to distribute this 3 into my x and my 2. So this is going to become 3x plus 6 is greater than or equal to negative one minus 4 x. Okay. Now since we have variables on both sides, this is where we need to move all of our variables to one side, all of our constants to the other, the same way we did with linear equations. So I want to move this 4 x to my left side and move my negative 6 to my right side. And I can do that by adding 4 x to both sides, you'll, of course, cancel on that right side, and then subtracting 6 from both sides, canceling it on the left and moving it to the right. Okay. So 3x + 4x is going to give me 7x. I still have my inequality symbol greater than or equal to. And then on that right side, I have negative 1 minus 6 which will give me negative 7. Okay. Last step here, we're going to go ahead and isolate x by dividing both sides by 7. Now I am simply left with x ≥ −1 and this is my solution.
But remember, we want to express our solution set in interval notation and graph it. So let's go ahead and graph first so that we can better visualize this solution. So my solution is x ≥ −1. I know that since it's greater than or equal to, I need to choose a solid circle, a closed circle, for my endpoint of negative one. And then since it's anything that's greater than or equal to negative 1, I'm just going to use an arrow to indicate that that goes all the way to infinity. Okay. Now that I can visualize it better, what is this in interval notation? Well, interval notation for this, since I know that that negative one endpoint is included, I'm going to use a square bracket to enclose that endpoint of negative one, and then that goes all the way to anything greater than negative one, which is just infinity which I always enclose with a parenthesis. And this is my final answer and my final graph. Let me know if you have any questions.
Solve the inequality. Express the solution set in interval notation and graph.
31(x+1)≥51(3+2x)
(−4,∞)
[4,∞)
[−4,∞)
(−∞,−4]
Here’s what students ask on this topic:
What is interval notation and how is it used to express solution sets?
Interval notation is a method of writing subsets of the real number line. It uses parentheses and square brackets to describe intervals. Parentheses, ( and ), indicate that an endpoint is not included in the interval, while square brackets, [ and ], indicate that an endpoint is included. For example, the interval [3, ∞) represents all numbers greater than or equal to 3. This notation is particularly useful for expressing solution sets of inequalities compactly. For instance, the solution to x ≥ 3 is written as [3, ∞) in interval notation.
How do you solve linear inequalities and graph their solutions?
To solve linear inequalities, follow the same steps as solving linear equations: isolate the variable on one side. For example, to solve 2x - 6 ≤ 0, add 6 to both sides to get 2x ≤ 6, then divide by 2 to get x ≤ 3. When graphing, use a closed circle for ≤ or ≥ and an open circle for < or >. Draw a line to the left for ≤ or < and to the right for ≥ or >. For x ≤ 3, place a closed circle at 3 and shade to the left. In interval notation, this is written as (-∞, 3].
What happens when you multiply or divide both sides of an inequality by a negative number?
When you multiply or divide both sides of an inequality by a negative number, you must flip the direction of the inequality sign. For example, if you have -2x ≤ 6, dividing both sides by -2 gives x ≥ -3. This rule ensures the inequality remains true. Always remember to reverse the inequality sign to maintain the correct relationship between the values.
How do you express the solution to a linear inequality in interval notation?
To express the solution to a linear inequality in interval notation, identify the range of values that satisfy the inequality. For example, if the solution is x ≥ -1, the interval notation is [-1, ∞). Use square brackets for inclusive endpoints (≤ or ≥) and parentheses for exclusive endpoints (< or >). For x < 4, the interval notation is (-∞, 4). This notation provides a concise way to represent the solution set.
How do you solve linear inequalities with fractions and variables on both sides?
To solve linear inequalities with fractions and variables on both sides, first eliminate the fractions by multiplying the entire inequality by the least common denominator (LCD). For example, for (1/4)x + 2 ≥ (1/12) - (1/3)x, multiply by 12 (the LCD) to get 3x + 24 ≥ 1 - 4x. Then, combine like terms and isolate the variable. Add 4x to both sides to get 7x + 24 ≥ 1, then subtract 24 from both sides to get 7x ≥ -23. Finally, divide by 7 to get x ≥ -23/7. Graph the solution and express it in interval notation as [-23/7, ∞).