Khan academy adding fractions with unlike denominators

Video transcript

Let's add 19 and 3/18 to 18 and 2/3. So I like to separate out the whole number parts from the fraction parts. So 19 and 3/18 is the same thing as 19 plus 3/18. And to that, we are going to add 18 and 2/3, which is the same thing as 18 plus 2/3. Now we can separately add the whole number parts. So we could add the 19 to the 18. So we could do 19 plus 18. And then we can add the fraction parts-- let me do this in green-- plus 3/18 plus 2/3. Now 19/18, pretty straightforward. That is what? Let's see. 19 plus 19 would be 38. So this is going to be 1 less than that. It's going to be 37. So that gives me 37. And then 3/18 plus 2/3, to add them, I need to have the same denominator. And the least common multiple of 18 and 3 is 18. So let's convert 2/3 to something over 18. So 2/3, if I want to write it as something over 18, well, I multiplied the denominator by 6, so I'd also have to multiply the numerator by 6. So it's the same thing as 12/18. So I can rewrite 2/3 as 12/18. And now I can add these two things together. That's going to be-- so I have 37 plus-- it's going to be something over 18-- plus something over 18. 3 plus 12 is 15, plus 15/18. And so expressing this as a mixed number, I get 37 and 15/18. And that's the right number. But we can simplify it even more. We can simplify the 15/18. Both the numerator and the denominator are divisible by 3. So let's divide them both by 3. And we're not changing the value because we're doing the same thing to the numerator and the denominator. And so this gives us, we still have our 37, but the numerator is now 5, and the denominator is now 6. So we get 37 and 5/6. And we're done.

Video transcript

Cindy and Michael need 1 gallon of orange paint for the giant cardboard pumpkin they are making for Halloween. Cindy has 2/5 of a gallon of red paint. Michael has got 1/2 a gallon of yellow paint. If they mix their paints together, will they have the 1 gallon they need? So let's think about that. We're going to add the 2/5 of a gallon of red paint, and we're going to add that to 1/2 a gallon of yellow paint. And we want to see if this gets to being 1 whole gallon. So whenever we add fractions, right over here we're not adding the same thing. Here we're adding 2/5. Here we're adding 1/2. So in order to be able to add these two things, we need to get to a common denominator. And the common denominator, or the best common denominator to use, is the number that is the smallest multiple of both 5 and 2. And since 5 and 2 are both prime numbers, the smallest number's just going to be their product. 10 is the smallest number that we can think of that is divisible by both 5 and 2. So let's rewrite each of these fractions with 10 as the denominator. So 2/5 is going to be something over 10, and 1/2 is going to be something over 10. And to help us visualize this, let me draw a grid. Let me draw a grid with tenths in it. So, that's that, and that's that right over here. So each of these are in tenths. These are 10 equal segments this bar is divided into. So let's try to visualize what 2/5 looks like on this bar. Well, right now it's divided into tenths. If we were to divide this bar into fifths, then we're going to have-- actually, let me do it in that same color. So it's going to be, this is 1 division, 2, 3, 4. So notice if you go between the red marks, these are each a fifth of the bar. And we have two of them, so we're going to go 1 and 2. This right over here, this part of the bar, represents 2/5 of it. Now let's do the same thing for 1/2. So let's divide this bar exactly in half. So, let me do that. I'm going to divide it exactly in half. And 1/2 literally represents 1 of the 2 equal sections. So this is one 1/2. Now, to go from fifths to tenths, you're essentially taking each of the equal sections and you're multiplying by 2. You had 5 equals sections. You split each of those into 2, so you have twice as many. You now have 10 equal sections. So those 2 sections that were shaded in, well, you are going to multiply by 2 the same way. Those 2 are going to turn into 4/10. And you see it right over here when we shaded it initially. If you Look at the tenths, you have 1/10, 2/10, 3/10, and 4/10. Let's do the same logic over here. If you have 2 halves and you want to make them into 10 tenths, you have to take each of the halves and split them into 5 sections. You're going to have 5 times as many sections. So to go from 2 to 10, we multiply by 5. So, similarly, that one shaded-in section in yellow, that 1/2 is going to turn into 5/10. So we're going to multiply by 5. Another way to think about it. Whatever we did to the denominator, we had to do the numerator. Otherwise, somehow we're changing the value of the fraction. So, 1 times 5 is going to get you to 5. And you see that over here when we shaded it in, that 1/2, if you look at the tenths, is equal to 1, 2, 3, 4, 5 tenths. And now we are ready to add. Now we are ready to add these two things. 4/10 plus 5/10, well, this is going to be equal to a certain number of tenths. It's going to be equal to a certain number of tenths. It's going to be equal to 4 plus 5 tenths. And we can once again visualize that. Let me draw our grid again. So 4 plus 5/10, I'll do it actually on top of the paint can right over here. So let me color in 4/10. So 1, 2, 3, 4. And then let me color in the 5/10. And notice that was exactly the 4/10 here, which is exactly the 2/5. Let me color in the 5/10-- 1, 2, 3, 4, and 5. And so how many total tenths do we have? We have a total of 1, 2, 3, 4, 5, 6, 7, 8, 9. 9 of the tenths are now shaded in. We had 9/10 of a gallon of paint. So now to answer their question, will they have the gallon they need? No, they have less than a whole. A gallon would be 10 tenths. They only have 9 tenths. So no, they do not have enough of a gallon. Now, another way you could have thought about this, you could have said, hey, look, 2/5 is less than 1/2, and you could even visualize that right over here. So if I have something less than 1/2 plus 1/2, I'm not going to get a whole. So either way you could think about it, but this way at least we can think it through with actually adding the fractions.

How do you add fractions with unlike denominators step by step?

To add fractions with unlike denominators, you should:.
Find the common denominator..
Rewrite each fraction using the common denominator..
Add the numerators..
Carry across the common denominator..
If possible, reduce the final fraction..

What is the easiest way to add fractions with unlike denominators?

You simply use the product of the two denominators as a common denominator. Then, in order to bring both fractions on that common denominator you only need to multiply the numerator of each by the denominator of the other. Easy!