Learn to Subtract Fractions (Adding & Subtracting Fractions) - Part 1 [11] - By Math and Science
Transcript
| 00:0-1 | Hello . Welcome back here . We're talking about subtracting | |
| 00:03 | fractions again with like denominators , this is part one | |
| 00:06 | . So I told you before and I'll say it | |
| 00:08 | again in order to add or subtract any fractions . | |
| 00:12 | The denominator is the bottom numbers of the fractions have | |
| 00:15 | to be the same thing . So when we added | |
| 00:17 | fractions earlier we had to have the denominators the same | |
| 00:20 | in order to do anything and we're doing the same | |
| 00:22 | thing here . So it's very very similar to adding | |
| 00:24 | fractions . We kept the denominator the same in our | |
| 00:27 | answer and we just added the enumerators . The top | |
| 00:30 | numbers together here , it's going to be the same | |
| 00:32 | thing except we'll be keeping the denominator the same just | |
| 00:36 | like before . But here will be subtracting the enumerators | |
| 00:39 | . That's the difference , adding and subtracting fractions are | |
| 00:42 | actually very very similar to each other . In one | |
| 00:44 | case we add the numerator here , we're going to | |
| 00:46 | be adding the denominators . So let's get some practice | |
| 00:49 | uh here and we'll use our magnets as we go | |
| 00:52 | along here to get some additional so we can understand | |
| 00:54 | what's going on . Let's take a look at the | |
| 00:57 | fraction 4/5 and we want to subtract from that , | |
| 01:02 | the fraction 3/5 . So the first thing we do | |
| 01:05 | is we check our , the denominator is the same | |
| 01:07 | . In order to add or subtract fractions . The | |
| 01:10 | denominators must be the same . We'll talk a little | |
| 01:13 | bit more about why in just a minute . But | |
| 01:14 | for now keep the denominator the same in your answer | |
| 01:18 | . The denominator has to be a five . You | |
| 01:20 | do not subtract the denominators , you keep the same | |
| 01:24 | denominator in your answer . Just like for adding , | |
| 01:26 | we keep it here Now in the numerator which is | |
| 01:29 | the top , we have a four and a three | |
| 01:31 | but we have a minus sign . So it's four | |
| 01:33 | minus three . So instead of adding them we basically | |
| 01:36 | subtract him . It's very very simple . Four minus | |
| 01:39 | three as you know , is one . And then | |
| 01:41 | of course five stays along for the ride . 1/5 | |
| 01:44 | . And then we ask ourselves can we simplify this | |
| 01:47 | fraction by dividing the top or the bottom or the | |
| 01:50 | top and the bottom of the fraction by the same | |
| 01:52 | number . We really can't do anything , we can't | |
| 01:54 | divide top and bottom by anything that's going to make | |
| 01:56 | these numbers any smaller . So 1/5 is the final | |
| 01:59 | answer . So let's talk about why this makes sense | |
| 02:02 | . Right ? So here we have four out of | |
| 02:04 | five pieces of a pizza . So we have a | |
| 02:06 | pizza cut into let's go ahead and call it five | |
| 02:09 | pieces . So 1/5 2 5th , 3 fits four | |
| 02:12 | fits here is 5/5 . That's what we have a | |
| 02:15 | pizza cut into five pieces . But here we have | |
| 02:18 | four of those five pieces . 1234 That's what we | |
| 02:21 | have here , this is how much pizza we have | |
| 02:24 | . Now here we have three out of five pieces | |
| 02:27 | of pizza . So let's build another pizza . There's | |
| 02:29 | one , there's two , there's three , there's four | |
| 02:32 | and there's five . So here's another pizza again , | |
| 02:34 | cut into five pieces . But here I only have | |
| 02:37 | three of them . 123 So what we're saying is | |
| 02:41 | we have four out of five pieces of a pizza | |
| 02:43 | . And here we have three out of five pieces | |
| 02:45 | of a pizza , but instead of adding them together | |
| 02:48 | , making it larger , what we're gonna do is | |
| 02:50 | subtract them . Think about it . If you have | |
| 02:52 | four pieces of something and you take away three pieces | |
| 02:55 | of something , then you only have one piece left | |
| 02:58 | . And here we're saying we have four pieces of | |
| 03:00 | pizza . The five tells us how big the slices | |
| 03:03 | are basically . We have four of them here and | |
| 03:05 | we have three of them here , we subtract them | |
| 03:08 | . And so what we actually get when we subtract | |
| 03:10 | them four minus three is one , which is the | |
| 03:12 | answer 1/5 here . Because if we start with this | |
| 03:16 | and we take away three of those pieces like this | |
| 03:19 | , what are we left with ? Only one piece | |
| 03:21 | left ? Addition would be if we add these together | |
| 03:24 | , subtraction as we take this amount and we take | |
| 03:26 | it away , we only have that one piece left | |
| 03:29 | , so we have 1/5 there . So that's why | |
| 03:32 | when we take when we check to make sure the | |
| 03:34 | denominators are the same , we keep the same denominator | |
| 03:37 | in our answer because I've been telling you before that | |
| 03:39 | I want you to start viewing these fraction wedges as | |
| 03:42 | things that you can count . You don't really want | |
| 03:45 | to add or subtract wedges of different sizes , I | |
| 03:48 | mean you could but they're different , they won't make | |
| 03:50 | a lot of sense to add one third or subtract | |
| 03:53 | one third and 1/4 because the size of the slices | |
| 03:57 | there would be different here , all the slices of | |
| 03:59 | the same thing . So it's a simple matter of | |
| 04:00 | just subtracting them or adding them together . That's why | |
| 04:03 | we keep the same denominator in the same , because | |
| 04:06 | here we have four out of five pieces , we | |
| 04:07 | take away three out of those five pieces . How | |
| 04:10 | many do we have ? Left ? One out of | |
| 04:12 | five pieces of the pizza ? Uh there . And | |
| 04:16 | of course we try to simplify that and we really | |
| 04:18 | can't uh simplify any further . So we're done . | |
| 04:20 | Right , alright , let's go on , I'm gonna | |
| 04:23 | leave this up here , we'll kind of kind of | |
| 04:26 | refer back to it later . Let's take a look | |
| 04:27 | at the next problem . Let's say we have 3/4 | |
| 04:31 | And we want to subtract from it 1 4th now | |
| 04:34 | again the first problem have the problem written on its | |
| 04:37 | side horizontal like this . You can also see the | |
| 04:40 | problem stacked on top of each other , It's fine | |
| 04:42 | . Either way . Now we check four and four | |
| 04:45 | . Those are the denominator , so we keep the | |
| 04:48 | same denominator , We don't subtract them , we don't | |
| 04:49 | add them , we keep the same denominator , There's | |
| 04:52 | a four down here . Now what do we have | |
| 04:54 | on top three minus ? Because there's a minus 13 | |
| 04:57 | minus one that goes in the numerator instead of adding | |
| 05:00 | them , we subtract them three minus one is 22 | |
| 05:03 | out of four pieces . Now , what this is | |
| 05:05 | telling us is if we have three out of four | |
| 05:07 | pieces of a pizza and we take away from that | |
| 05:10 | one out of four pieces then we should have two | |
| 05:12 | pieces left over three pieces minus one piece . Should | |
| 05:15 | give us to pieces out of four , which tells | |
| 05:18 | us the slight how big the slices are there . | |
| 05:21 | But we check is this fully simplified ? No it's | |
| 05:24 | not because we can divide the top and the bottom | |
| 05:27 | by two because those are both even numbers . So | |
| 05:30 | let's take and divide the top by one . I'm | |
| 05:33 | sorry not by one , we're gonna divide the top | |
| 05:35 | by two and we'll also divide the bottom By two | |
| 05:39 | . We divide top and bottom by whatever we want | |
| 05:42 | . Two divided by two is one and four divided | |
| 05:44 | by two is 22 times two is 41 times two | |
| 05:47 | is two . So we think the answer is one | |
| 05:49 | half . Does this make any sense ? Let's check | |
| 05:52 | it out . Let's build this here . What we're | |
| 05:54 | saying is that this is 1/4 of a pizza , | |
| 05:58 | 2/4 of a pizza , 3/4 of a pizza and | |
| 06:01 | 4/4 of a pizza . We've cut the pizza into | |
| 06:03 | four equal slices , but we only have three of | |
| 06:07 | those slices . So this is actually how much pizza | |
| 06:09 | we have in the top fraction . The bottom fraction | |
| 06:12 | is 1/4 . That is this amount of the pizza | |
| 06:15 | , one out of four slices instead of adding them | |
| 06:17 | together . If we add them together we would just | |
| 06:19 | put it over here , would actually make a whole | |
| 06:21 | pizza if we add them together , but we're not | |
| 06:23 | we're taking away one slice from here . So it's | |
| 06:25 | like you take away one slice . What do you | |
| 06:27 | have left ? You have this ? You have 1/4 | |
| 06:30 | 2 4th , so we have 1/4 . To force | |
| 06:34 | this is what you get whenever you subtract it , | |
| 06:37 | because if you start with three out of four pieces | |
| 06:39 | and you take one of these away , you have | |
| 06:41 | this much left which is two out of four pieces | |
| 06:44 | . But you can see right away that two out | |
| 06:46 | of four pieces of anything is exactly the same as | |
| 06:48 | one half . You can actually see , it represents | |
| 06:51 | the same amount . So the answer is to force | |
| 06:54 | That's correct . That's a perfectly fine way of saying | |
| 06:56 | it . If you start with three pieces and you | |
| 06:58 | take away one piece , you should only have two | |
| 07:00 | pieces left . Out of out of uh out of | |
| 07:03 | four pieces of the pizza slice into four slices . | |
| 07:05 | But a simpler way to write it is as one | |
| 07:08 | half . This represents the exact same amount of pizza | |
| 07:11 | as that . All right , So I think I'll | |
| 07:14 | do one or maybe two more where we use our | |
| 07:16 | magnets , but more or less now I want to | |
| 07:18 | take the training wheels off and just solve the problems | |
| 07:21 | without using the magnets are really good to visualize but | |
| 07:24 | we do have to get good at doing this without | |
| 07:26 | putting magnets in place and counting anything . So what | |
| 07:29 | do we have ? Next problem is going to be | |
| 07:32 | uh 8/9 and we're going to subtract 1/9 we're subtracting | |
| 07:38 | fractions , The denominators must be the same and they | |
| 07:40 | are . So the denominator of our answer will be | |
| 07:42 | a nine next eight -1 . Those are the numerator | |
| 07:48 | eight and one , so we subtract them 8 -1 | |
| 07:50 | . And what do we get ? Eight minus one | |
| 07:51 | is seven and it's out of nine pieces . So | |
| 07:54 | if you start with eight out of nine pieces and | |
| 07:56 | you take away one out of nine pieces then you're | |
| 07:58 | only gonna have seven pieces left of course out of | |
| 08:00 | 979 And you cannot simplify this any further because you | |
| 08:04 | can't divide top and bottom by anything to make that | |
| 08:06 | simpler . So we just say that's the final answer | |
| 08:10 | . Mhm . Alright , problem number four . Let's | |
| 08:13 | say we have 7/10 and we're subtracting from that 4/10 | |
| 08:20 | . All right . What do we have the denominators | |
| 08:23 | here ? 10 and 10 . They're the same denominator | |
| 08:25 | , so we keep the same denominator in the answer | |
| 08:28 | . Then we have a seven and a four and | |
| 08:30 | of course there's subtracted . So the numerator is 7 | |
| 08:32 | -4 , what do we get ? 7 -4 Is | |
| 08:35 | three . And so it's three out of 10 pieces | |
| 08:38 | , three out of 10 pieces . So it makes | |
| 08:40 | sense if you start with seven out of 10 pieces | |
| 08:42 | of a pizza and you take away four slices . | |
| 08:45 | You start with seven slices and you take away four | |
| 08:47 | slices , you should have three slices left of course | |
| 08:50 | out of 10 . And so is this fully simplified | |
| 08:53 | ? Can we divide top and bottom by something To | |
| 08:56 | make it simpler ? And we can't because this is | |
| 08:58 | an odd number and this is an even number and | |
| 09:00 | we can't divide top and bottom by two or by | |
| 09:03 | three or anything else . So it's just three out | |
| 09:05 | of 10 . Now , this will be the last | |
| 09:07 | problem where I kind of use the magnets to help | |
| 09:09 | us kind of visualize , I do think it's worth | |
| 09:11 | doing , but after this one , we're not going | |
| 09:13 | to basically do this anymore . So there's 1 10 | |
| 09:16 | to 10 3/10 . 4/10 . Here's 5/10 . Here's | |
| 09:20 | 6/10 there is 7/10 . So this is the amount | |
| 09:24 | of pizza represented by this fraction . This is 4/10 | |
| 09:27 | . 1/10 2 10th , 3/10 . 4/10 . What | |
| 09:32 | this thing is staying here is if you start with | |
| 09:35 | this much . Pizza seven out of 10 slices And | |
| 09:37 | you subtract four out of 10 slices . Subtract this | |
| 09:41 | much , then it would be starting with this and | |
| 09:43 | taking away this amount of pizza and pulling it away | |
| 09:46 | . What do you have ? Left three out of | |
| 09:48 | 10 slices ? If you start with this amount and | |
| 09:51 | you take away the four slices , you have three | |
| 09:54 | out of 10 , that's basically what that means . | |
| 09:56 | Now , I am going to go ahead and just | |
| 09:57 | kind of leave this up here . We'll kind of | |
| 09:59 | why not just leave it there ? But we're not | |
| 10:01 | going to use the maggots anymore because it's very important | |
| 10:04 | for you to get good at this without , you | |
| 10:06 | know , drawing pictures . I think it's good to | |
| 10:08 | do . But we don't want to do it for | |
| 10:09 | every problem . All right , let's go over here | |
| 10:13 | and solve the next problem . Let's say we have | |
| 10:16 | 3/7 and we'll subtract from it 1/7 . All right | |
| 10:22 | . The denominator is a seven and a seven . | |
| 10:24 | So denominator is the same . We keep it in | |
| 10:27 | the answer . We have a three and a one | |
| 10:29 | , which means we subtract three minus one . What | |
| 10:31 | do we have ? Three minus one is two out | |
| 10:34 | of seven . Can we simplify this ? No , | |
| 10:36 | we can't . We can't divide top and bottom by | |
| 10:38 | anything else to make this simpler . So , we | |
| 10:41 | keep the answer is two out of seven pieces . | |
| 10:43 | Okay , that was problem number five . Actually , | |
| 10:47 | that was the halfway mark . Let's take a look | |
| 10:50 | at problem number six . Let's say we have seven | |
| 10:52 | out of 12 slices of pizza , and we'll subtract | |
| 10:56 | three out of 12 . Now , the denominators are | |
| 10:58 | the same , so , we keep it in our | |
| 11:00 | final answer . And then we subtract the top number | |
| 11:03 | seven minus three . So , over here we'll have | |
| 11:05 | seven minus three When you do 7 -3 , what | |
| 11:08 | do you get ? You get four and of course | |
| 11:10 | it's still out of 12 pieces . And then you | |
| 11:13 | ask yourself , can I simplify this ? Can I | |
| 11:14 | divide top and bottom ? Well actually I can divide | |
| 11:16 | top and bottom by four . I could also divide | |
| 11:19 | top and bottom by two . That's fine too . | |
| 11:21 | But if you divide by two then you'll get some | |
| 11:23 | other answer and you'll be able to divide by two | |
| 11:26 | again , you'll have to do it two times that's | |
| 11:28 | fine . There's nothing wrong with it . But let's | |
| 11:30 | you know , let's just we can recognize we can | |
| 11:33 | take 4/12 and divide the top and bottom by a | |
| 11:36 | larger number . We can divide by four , both | |
| 11:40 | divisible by 44 divided by four is one and 12 | |
| 11:44 | divided by four is three because three times four is | |
| 11:47 | 12 . And so the answer we get is one | |
| 11:49 | third . So if you start with seven slices out | |
| 11:52 | of 12 and you take away three slices , then | |
| 11:54 | you're going to have four slices left . This is | |
| 11:57 | the right amount of pizza , but this is just | |
| 11:59 | a simpler way to write the exact same amount of | |
| 12:01 | pizza . So that's the final answer . Yeah . | |
| 12:05 | All right , let's take a look at problems seven | |
| 12:08 | . Take a look at 5/8 and we'll take away | |
| 12:11 | subtract from that 1/8 . The denominators are the same | |
| 12:15 | . So because we're subtracting will keep that in our | |
| 12:17 | final answer and we have five minus one . So | |
| 12:20 | we have five minus one . In the numerator , | |
| 12:23 | 5 -1 as you know , is four and then | |
| 12:26 | we have eight . Now , can we simplify this | |
| 12:29 | ? Where we can divide top and bottom by four | |
| 12:32 | . You could also divide by two but then you | |
| 12:34 | would get something , you would have to divide by | |
| 12:36 | two again . So let's do it that way , | |
| 12:38 | let's not do the same exact thing every time we | |
| 12:40 | know we can divide by um we know we can | |
| 12:42 | divide by four because four certainly works but let's divide | |
| 12:46 | by two just to get some variety here , four | |
| 12:49 | divided by two is 2 and eight divided by two | |
| 12:52 | is 4 , So we get 2/4 but we see | |
| 12:55 | okay we can divide by two again . So let's | |
| 12:58 | go ahead and divide this by two and divide this | |
| 13:00 | by two and two divided by two is one and | |
| 13:04 | four divided by two is two . So you get | |
| 13:07 | one half . So is this fully simplified ? Yes | |
| 13:10 | , I can't make it that any simpler . And | |
| 13:12 | you also should ask yourself , doesn't make sense . | |
| 13:14 | The answer I got was four out of eight pieces | |
| 13:17 | . If I have eight pieces and I have four | |
| 13:19 | of those pieces then I have half the pizza . | |
| 13:22 | That's what we have here . But that's the same | |
| 13:24 | thing as what we got here . Two out of | |
| 13:25 | four pieces . We simplified it again , Here's 2/4 | |
| 13:28 | is also a half which is also 4/8 as a | |
| 13:32 | half . It all means the same amount of stuff | |
| 13:34 | . It's just that the fraction looks a little bit | |
| 13:35 | different . All right . We have only three problems | |
| 13:39 | left . What do we have here ? Let's take | |
| 13:43 | a look at five tents And we'll subtract from that | |
| 13:47 | 3/10 . These denominators are the same there . 10 | |
| 13:52 | . So we keep the denominator of the same at | |
| 13:54 | 10 and we have a 5 -3 in the numerator | |
| 13:57 | , 5 -3 . What is 5 -3 ? That's | |
| 14:00 | going to be too . And then you have 10 | |
| 14:02 | here now , this is the final answer . That's | |
| 14:05 | great . But can you simplify it ? Yes , | |
| 14:07 | you can . They're both divisible by two . So | |
| 14:09 | we'll take the 2/10 and we'll divide the top and | |
| 14:13 | bottom by to divide this by two . We can | |
| 14:16 | divide this by 22 divided by two is 1 , | |
| 14:20 | 10 , divided by two is five . And so | |
| 14:23 | the answer is 1/5 . We get 1/5 of the | |
| 14:25 | answer . So if you start out with five pieces | |
| 14:28 | out of 10 and you take away three pieces or | |
| 14:30 | slices , then you will only have two slices left | |
| 14:33 | out of a 10 slice pizza . Right ? That's | |
| 14:35 | correct . But a simpler way of writing the same | |
| 14:37 | amount of pizza is just to cut a new pizza | |
| 14:40 | into five slices and only take one . It's the | |
| 14:42 | same thing . All right , so homestretch only two | |
| 14:48 | more problems and here's the next one . What about | |
| 14:51 | 8/12 ? And we'll subtract from that 3 , 12 | |
| 14:56 | . The denominators are the same , which is 12 | |
| 14:59 | . So we'll go ahead and keep that in our | |
| 15:01 | final answer . And the numerator , we have eight | |
| 15:03 | and a three and it's minus . So it's eight | |
| 15:05 | minus three . In the numerator , eight going down | |
| 15:09 | 7658 minus three is five . And you get 5 | |
| 15:12 | 12 . Can you simplify this ? No , we | |
| 15:14 | can't . We cannot divide top and bottom by something | |
| 15:17 | to make these numbers simpler uh smaller . And so | |
| 15:21 | we just say 5/12 is the final answer . All | |
| 15:25 | right . Now we have our very last problem . | |
| 15:28 | We have eight 9th and we're subtracting from it five | |
| 15:33 | nights . First thing we check our the denominators the | |
| 15:36 | same . Yes they are . So we keep it | |
| 15:38 | in the final answer . And then on top we | |
| 15:40 | have an eight minus five . So we write that | |
| 15:43 | is eight minus five , what is eight minus five | |
| 15:45 | ? When you subtract that , you get a three | |
| 15:47 | and you get of course out of nine pieces . | |
| 15:49 | So if you start with eight pieces and out of | |
| 15:52 | nine and you take away five pieces of course when | |
| 15:54 | the pizza sliced into nine pieces , you will have | |
| 15:56 | three pieces left . But this can be simplified , | |
| 15:58 | we can divide top and bottom by three . So | |
| 16:01 | let's take that 3/9 and they're both divisible by three | |
| 16:06 | . So we'll divide by three , divide by three | |
| 16:08 | , three divided by three is one and nine divided | |
| 16:11 | by three is three . So you get the answer | |
| 16:13 | of one third . So the answer we got of | |
| 16:15 | three nines is correct . But to make it simpler | |
| 16:18 | , this is a simpler way of writing the same | |
| 16:20 | exact amount of pizza and you write that as one | |
| 16:23 | third . So here we have conquered the idea of | |
| 16:25 | subtracting fractions with like denominators , you can see it's | |
| 16:29 | the same process as edition . Other than the fact | |
| 16:32 | that when we subtract , we have to subtract the | |
| 16:35 | numbers on top enumerators instead of adding them . But | |
| 16:38 | the denominators have to be the same to subtract them | |
| 16:41 | just like for addition and we keep the same denominator | |
| 16:43 | in the answer , just like addition . And we | |
| 16:46 | just subtract enumerators and simplify the answers . So I'd | |
| 16:49 | like you to practice all of these yourself . Follow | |
| 16:51 | me on the part two and we'll wrap up the | |
| 16:53 | concept of subtracting fractions when they have like denominators . |
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