Learn the Meaning of Multiplying Decimals - [13] - By Math and Science
Transcript
| 00:00 | Hello . Welcome back . The title of this lesson | |
| 00:02 | is called Multiplying decimals using models . This is part | |
| 00:06 | one . Probably a better title would be understanding decimal | |
| 00:10 | . Multiplication using pictures using models . I'm really excited | |
| 00:13 | to teach you this because you'd be surprised how many | |
| 00:15 | people , adults don't really understand what it means when | |
| 00:19 | you multiply a number Times of decimal or a decimal | |
| 00:23 | times of decimal . You know , we learn how | |
| 00:24 | to do it in school but a lot of times | |
| 00:26 | people don't really understand what it means to multiply by | |
| 00:30 | .3 or multiply pie .4 or whatever . So here | |
| 00:34 | what we're going to do is you will understand by | |
| 00:36 | the end of this lesson exactly what multiplying by a | |
| 00:39 | decimal does and what it means . And as we | |
| 00:41 | build those skills in the future lessons will do a | |
| 00:43 | lot of practice with decimal multiplication to get the hang | |
| 00:46 | of it . So the first way I want to | |
| 00:48 | talk about this is I want to talk about multiplying | |
| 00:50 | something times 0.5 because it's the easiest thing to do | |
| 00:54 | in the back of your mind as we talk about | |
| 00:56 | this discussion . When you think of 0.5 of something | |
| 00:59 | I want you to think of . 0.5 means the | |
| 01:01 | same thing as half of something , decimals and fractions | |
| 01:04 | go together like peanut butter and jelly . And I | |
| 01:06 | want you to remember that 0.5 is exactly the same | |
| 01:10 | thing as one half of something . So 0.5 is | |
| 01:12 | the same as one half of something . So for | |
| 01:14 | our first problem , we want to look at this | |
| 01:18 | problem here . 0.4 times 0.5 . Now I'm gonna | |
| 01:21 | teach you how to do this by hand by doing | |
| 01:23 | the actual multiplication in a future lesson . This lesson | |
| 01:26 | has nothing to do with that . This lesson is | |
| 01:27 | for us to understand what does this actually mean ? | |
| 01:30 | All right . So what we want to do first | |
| 01:32 | is we want to understand that if I were taking | |
| 01:34 | 0.4 times let's pretend for a second that that we're | |
| 01:38 | not actually multiplying by .5 . Let's pretend we're just | |
| 01:40 | multiplying by one . What happens when you multiply something | |
| 01:43 | by one ? It means you just keep the same | |
| 01:46 | number right ? Two times one is 23 times , | |
| 01:48 | one is three and so on . So if it | |
| 01:51 | were 0.4 times won , the answer would just be | |
| 01:54 | 0.4 . But we're not multiplying by one . C | |
| 01:57 | . When you multiply by one , it keeps the | |
| 01:59 | number unchanged , right ? But here we're multiplying by | |
| 02:02 | 0.5 , which is the same thing as half . | |
| 02:05 | So what I want you to start thinking about is | |
| 02:07 | when you multiply the thing that you're multiplying by when | |
| 02:11 | it's a decimal , I think like that I want | |
| 02:13 | you to think of That second thing you're multiplying by | |
| 02:15 | is like a chopping function I want , I'm using | |
| 02:18 | my hand here to think , I want you to | |
| 02:20 | think of chopping so what you're doing is you're taking | |
| 02:22 | something that's 0.4 and you're chopping it in half . | |
| 02:26 | That's what if you read it out loud , you're | |
| 02:27 | taking this , you're chopping up by this amount and | |
| 02:30 | this decimal amount of 0.5 is the same thing as | |
| 02:33 | cutting it in half . If we were chopping this | |
| 02:35 | thing times one Then nothing would change , it would | |
| 02:38 | be 0.4 times one is 0.4 , but we're multiplying | |
| 02:42 | by instead of one , we're multiplying by a half | |
| 02:45 | , so we're chopping it in half . So whatever | |
| 02:47 | we start with , We multiply by .5 , we're | |
| 02:51 | just cutting it in half and that's going to be | |
| 02:53 | what the answer is . We want to now draw | |
| 02:55 | pictures to show what this means . First of all | |
| 02:58 | , we have some diagrams here . I know it | |
| 03:00 | looks confusing . I want you to completely ignore this | |
| 03:02 | on the right . This little diagram is going to | |
| 03:05 | represent the .4 and this little diagram is going to | |
| 03:09 | represent the .5 . Now , before you do anything | |
| 03:12 | else , I'm going to draw kind of under here | |
| 03:15 | , I'm gonna put that . This is one whole | |
| 03:19 | and this thing right here is also one hole . | |
| 03:23 | So this box here , it represents one and this | |
| 03:28 | box , this entire box also represents one for now | |
| 03:31 | completely ignore the answer . I don't want you to | |
| 03:33 | look at the answer . All right . So if | |
| 03:35 | this represents one then what is 0.4 ? Remember the | |
| 03:39 | first decimal here , .4 is the 10th place . | |
| 03:43 | That means that we take whatever we're talking about , | |
| 03:45 | we chop it into 10 pieces and 0.4 means four | |
| 03:49 | out of 10 pieces because it's the 10th place . | |
| 03:52 | So if we want to represent four out of 10 | |
| 03:54 | pieces , notice I've already chopped this into 1234 56789 | |
| 03:59 | 10 pieces . This is 10 equal pieces . This | |
| 04:02 | hole is cut into 10 equal pieces , so if | |
| 04:05 | we want to represent what 0.4 really looks like they | |
| 04:08 | will take the whole and we will only discuss or | |
| 04:11 | talk about four of those 10 pieces . So there's | |
| 04:15 | one out of 10 1/10 Here's two out of 10 | |
| 04:18 | to 10s , here's three out of 10 which is | |
| 04:21 | three tens and here's four out of 10 which is | |
| 04:25 | 4/10 . So this shading of this much of the | |
| 04:28 | whole represents 0.4 . How do we know that ? | |
| 04:32 | Because 0.4 is 4/10 or four out of 10 pieces | |
| 04:37 | . We've taken the whole thing , we've cut it | |
| 04:39 | into 10 pieces and we only shade four of them | |
| 04:41 | . So this box here , this shaded region here | |
| 04:44 | represents 0.4 of something you can think of . This | |
| 04:47 | being like a sandwich . And if you cut this | |
| 04:50 | much of the sandwich away , then this is 0.4 | |
| 04:52 | of the sandwich . So that's the number we're multiplying | |
| 04:56 | to begin with . Now , what are we going | |
| 04:58 | to chop it by ? What are we going to | |
| 04:59 | multiply by ? We said if we were multiplying by | |
| 05:03 | instead of this one , then this whole thing would | |
| 05:06 | be shaded with one and then the answer would be | |
| 05:09 | exactly the same . 0.4 times one is 0.4 . | |
| 05:12 | Nothing changes . But we're multiplying by 0.5 . Let's | |
| 05:16 | write down what 0.5 would look like on here . | |
| 05:19 | I have this box again into 23456789 10 pieces . | |
| 05:24 | So what we want to do is we want to | |
| 05:27 | represent that In terms of a picture . So 0.5 | |
| 05:31 | means five out of 10 pieces . So here is | |
| 05:34 | one out of those 10 pieces . Here's two out | |
| 05:37 | of those 10 pieces . Here's three out of those | |
| 05:40 | 10 pieces , 0.3 here , 0.4 because it's four | |
| 05:44 | out of 10 pieces . And here 0.5 which is | |
| 05:47 | five out of the 10 pieces . Notice that this | |
| 05:50 | represents half . It's literally half of the entire object | |
| 05:54 | . If you cut this entire thing in half , | |
| 05:56 | this is a half and this is the other half | |
| 05:59 | . So I told you in the beginning that 0.5 | |
| 06:01 | is the same thing as one half . This is | |
| 06:03 | why because if I take an object and cut it | |
| 06:06 | into 10th like 10 pieces , 10th and I shade | |
| 06:10 | five of the 10 pieces , I'm gonna have half | |
| 06:12 | of it . So when you multiply by .5 you're | |
| 06:15 | chopping it by this . So I'm gonna write here | |
| 06:18 | chop right ? So the multiplication means chop you take | |
| 06:23 | what you start with which is this much of a | |
| 06:25 | sandwich . And this second picture is only telling you | |
| 06:28 | how much you're chopping it and in this case we're | |
| 06:31 | just chopping it in half . So if I know | |
| 06:33 | that I have this much of the sandwich which is | |
| 06:35 | less than half of it to begin with . And | |
| 06:37 | this is telling me when I multiply that I'm going | |
| 06:39 | to chop this in half , then I know without | |
| 06:42 | doing any math that the final answer is just gonna | |
| 06:45 | be half of what I started with because I'm multiplying | |
| 06:47 | by 0.5 which is a half . So before I | |
| 06:49 | do anything else over there , I know that the | |
| 06:52 | answer is going to be about this much because it's | |
| 06:54 | going to be half of what I started with . | |
| 06:56 | So what I want you to do in your mind | |
| 06:59 | is I want you to use this as a chop | |
| 07:02 | . We can kind of extend this , you can | |
| 07:05 | kind of like extend this over here and kind of | |
| 07:08 | like do a little dot , dot , dot , | |
| 07:09 | I'll kind of like do it right here , I | |
| 07:10 | guess a little dot dot dot , because we're gonna | |
| 07:11 | chop this in half . This is using this amount | |
| 07:15 | is used to chop this thing in half is to | |
| 07:18 | chop chop this thing in half . So I can | |
| 07:21 | kind of like kind of go through here like this | |
| 07:24 | . And I know over here that I had four | |
| 07:26 | columns and kind of like reproduce 1234 columns and kind | |
| 07:29 | of go through here and you see what I'm doing | |
| 07:32 | . I'm finding where these intersect which is all of | |
| 07:34 | this right here . All of this right here . | |
| 07:39 | Because literally all I have done , All I've done | |
| 07:45 | is I've taken what I've started with which is this | |
| 07:48 | much 0.4 of a sandwich or whatever and have multiplied | |
| 07:51 | by this , which is a chopping factor . This | |
| 07:54 | tells me how much to chop , which means I | |
| 07:55 | chop this much away and that is how much I | |
| 07:58 | have left in my answer . So then in order | |
| 08:01 | to figure out what the answer is going to be | |
| 08:05 | , I need to count squares over here , right | |
| 08:07 | ? Because if I take this and I slice it | |
| 08:10 | this way , I'm going to be dividing these into | |
| 08:12 | more squares . So notice here , I had these | |
| 08:15 | were sliced into 10 equal pieces and this is sliced | |
| 08:18 | into 10 equal pieces . But once I do the | |
| 08:20 | chopping now it's like the whole entire sandwiches chopped into | |
| 08:23 | how many pieces ? 123456789 10 . That's 10 this | |
| 08:28 | way and 10 this way 10 times 10 is 100 | |
| 08:32 | . So this answer here is represented out of 100 | |
| 08:36 | pieces of the sandwich . How many do I have | |
| 08:39 | ? 123456789 10 11 12 13 14 15 16 17 | |
| 08:45 | 18 1920 20 hundreds . So the answer is going | |
| 08:50 | to be 20 100 0.20 right ? Because when you | |
| 08:56 | read decimals , remember you take a look at how | |
| 08:59 | many spots you have . This is the 10th place | |
| 09:01 | and this is the hundreds place . So if you | |
| 09:03 | look at the whole number , it's 20 out of | |
| 09:05 | 100 because this position here Is the hundreds place . | |
| 09:09 | So you read everything after the decimal 20 is what's | |
| 09:12 | after the decimal , but it goes to the hundreds | |
| 09:14 | place . So it's 20 out of 100 pieces , | |
| 09:17 | so 20 hundreds , so 200.0 point 20 is how | |
| 09:21 | we represent that . Now , getting the answer in | |
| 09:24 | 0.2 is something I'm going to show you how to | |
| 09:27 | do later , but you can kind of think about | |
| 09:29 | it . It makes sense because if you start with | |
| 09:31 | 0.4 and you cut it in half , it makes | |
| 09:33 | sense that the answer should be 0.2 because half of | |
| 09:36 | four is too right , that's what makes sense . | |
| 09:39 | We're gonna learn how to do it by hand in | |
| 09:42 | a minute . But for now again just want you | |
| 09:44 | to realize when you take something and cut it into | |
| 09:46 | 10 pieces and take 4/10 and then you multiply by | |
| 09:50 | 100.5 , which means you cut it in half , | |
| 09:52 | you chop it . This is the amount that I | |
| 09:54 | have in my answer , but I'm gonna express the | |
| 09:57 | answer in terms of hundreds because then I can line | |
| 10:01 | up everything properly and count the squares here , so | |
| 10:03 | I cut it into 100 pieces and I have 20 | |
| 10:05 | of them , so 20 hundreds . The answer is | |
| 10:08 | that you get here , I don't really care that | |
| 10:11 | much if you're getting the correct answers yet , because | |
| 10:13 | I'm going to show you how to multiply by hand | |
| 10:15 | right now , what I'm really trying to teach you | |
| 10:17 | is to multiply decimals , you're taking the first number | |
| 10:20 | . And the second thing the thing you're multiplying by | |
| 10:22 | is like a chopping factor which just cuts the thing | |
| 10:25 | in half and we're expressing the answer in terms of | |
| 10:28 | hundreds because that way we can just fill the squares | |
| 10:31 | out here and and write the answer down . So | |
| 10:35 | that was our first problem . We have to do | |
| 10:37 | a lot of talking for that first problem . Um | |
| 10:40 | And um I think before I do the next problem | |
| 10:43 | , I want to take a step back and just | |
| 10:46 | kind of like talk a little bit more for a | |
| 10:47 | second . Let's just say forget about pictures for a | |
| 10:50 | second . What if I ask you , what if | |
| 10:53 | I take the number eight ? Not 0.8 , just | |
| 10:55 | eight . And I multiply it by 0.5 . Now | |
| 10:59 | that you know what's happening here , what do you | |
| 11:01 | think is gonna happen ? What you're telling me or | |
| 11:04 | what I'm telling you is that if I take eight | |
| 11:06 | uh I don't know , eight bananas and I multiplied | |
| 11:09 | by 80.5 , I'm chopping it by 0.5 . We | |
| 11:12 | know that 0.5 means I have . So when you | |
| 11:14 | multiply , it means chop it means chop it by | |
| 11:17 | that much . By that factor . If we take | |
| 11:19 | eight bananas and we chop it in half . What | |
| 11:21 | do we have left eight bananas when you cut it | |
| 11:23 | in half ? How many do you have four ? | |
| 11:25 | Now ? I'm going to show you how to do | |
| 11:27 | it by hand , but I want you to know | |
| 11:29 | what it means , and eight times 80.5 is four | |
| 11:32 | . What if I give you , you know uh | |
| 11:34 | 16 times 0.5 we're gonna take 16 you know , | |
| 11:40 | pumpkins , and we're gonna chop it in half , | |
| 11:42 | because their 160.5 means a half . And so what's | |
| 11:45 | going to happen is you take this and cut it | |
| 11:47 | in half . So you're going to basically write that | |
| 11:49 | down and look at it . You can convince yourself | |
| 11:51 | that that's equal to 88 times two is 16 . | |
| 11:53 | So when we cut this in half , we know | |
| 11:55 | the answer is eight . When we multiply by point | |
| 11:58 | half 80.0.5 we cut things in half . When we | |
| 12:01 | multiply by one , we don't change anything . When | |
| 12:05 | we multiply by zero we get zero and anything in | |
| 12:08 | between that we multiply by any decimal is just going | |
| 12:11 | to chop it by that much . So for instance | |
| 12:13 | if we're just thinking about it here , if we | |
| 12:17 | have zero right here and we have one right here | |
| 12:21 | , we're gonna right down chopping factors . We multiply | |
| 12:25 | by 0.5 . Where does 0.5 live here ? Between | |
| 12:29 | zero and one ? Exactly in the middle is 0.50 | |
| 12:33 | point five is half . So it's right in the | |
| 12:35 | middle it's between zero and one . It's called one | |
| 12:37 | half . What I'm trying to get you to see | |
| 12:39 | is that if you take a number and multiplying by | |
| 12:41 | a chopping factor . If we multiply by point half | |
| 12:44 | 0.0.5 we're multiplying by a half . So we cut | |
| 12:46 | it in half . If we multiply this by one | |
| 12:49 | , anywhere over here by by one , then we're | |
| 12:52 | going to get more and more of the original thing | |
| 12:54 | . So 16 times one would be 16 , right | |
| 12:58 | ? If we go the other direction here and multiply | |
| 13:00 | by 0 , 16 times zero is zero . So | |
| 13:04 | if we multiply by one , we get the original | |
| 13:06 | number . If we multiply by zero , we just | |
| 13:09 | get zero . If we multiply by a half a | |
| 13:12 | 00.5 we get half of what we started with . | |
| 13:14 | If I multiply by some number over here , you | |
| 13:18 | know like this number might be 0.25 or a number | |
| 13:22 | over here . This number might be 0.8 . All | |
| 13:25 | that's happening is you're chopping it by by more . | |
| 13:28 | If I multiply by .8 then I'm going to get | |
| 13:31 | something closer to 16 . If I multiply by one | |
| 13:35 | then I'll exactly get 16 . If I multiply by | |
| 13:37 | something less than .5 , I multiply by .25 or | |
| 13:41 | .1 or point something even lower , then I'm chopping | |
| 13:45 | and getting less and less and less . All I'm | |
| 13:47 | trying to get you to see is when you multiply | |
| 13:49 | by decimals , that second thing you're multiplying by is | |
| 13:52 | a chopping factor . The closer your chopping factor is | |
| 13:55 | to the number one , then the closer you get | |
| 13:58 | everything that you started with , but the farther away | |
| 14:01 | you're chopping factor is 20 The less you get what | |
| 14:04 | you started with . And if you chop exactly by | |
| 14:06 | 200.5 of course you just cut the thing in half | |
| 14:09 | . And so now that we have the idea , | |
| 14:11 | let's fill out the rest of these problems are going | |
| 14:12 | to go very fast now , What if we start | |
| 14:15 | with 0.2 ? And we multiply by the chopping factor | |
| 14:17 | of .8 , so we're gonna start with this and | |
| 14:20 | we're not gonna cut it in half , we're going | |
| 14:21 | to get more than half of it because we're chopping | |
| 14:24 | up by something bigger than a half , we're yeah | |
| 14:27 | , we're chopping up by something bigger than a half | |
| 14:28 | . So 0.2 would be two out of 10 slices | |
| 14:33 | of something . So this thing is cut into 10 | |
| 14:35 | pieces , 100.2 is equal to this , much of | |
| 14:38 | whatever you're starting with , and I'm multiplying by 0.8 | |
| 14:42 | and that means I'm multiplying by something , I'm multiplying | |
| 14:46 | something . Buy something that is much larger than uh | |
| 14:51 | than a half . I'm multiplying by , here's one | |
| 14:55 | , Here's two out of 10 , here's three out | |
| 14:58 | of 10 , here's four , Here's five , here's | |
| 15:03 | 6 , here's seven and here's 88 out of 10 | |
| 15:09 | . So this is my chopping factor , I'll just | |
| 15:11 | write it on the top here to remind you chop | |
| 15:13 | , this is what you're shopping by , so if | |
| 15:15 | I put a little dash line through here and I | |
| 15:18 | can carry that dash line over here , then I | |
| 15:22 | can see what's going to happen if I start with | |
| 15:23 | this much and this is a chopping factor . It's | |
| 15:26 | telling me that I'm only keeping this much of it | |
| 15:28 | , I'm throwing the rest away and I'm chopping , | |
| 15:30 | I'm keeping all of this . If I were to | |
| 15:33 | chop with a factor of one , that would be | |
| 15:35 | the entire thing and then I would keep everything because | |
| 15:38 | something times one is itself . But you can see | |
| 15:40 | here that by chopping by this much , I'm only | |
| 15:42 | going to keep this amount , so I go over | |
| 15:44 | here and I shade that amount . And so it | |
| 15:48 | was the first two columns up until this point . | |
| 15:51 | So I can kind of fill these out like this | |
| 15:54 | . And then I can , instead of expressing intense | |
| 15:57 | , I'll express these squares in hundreds . How many | |
| 15:59 | hundreds do I have ? 123456789 10 , 11 , | |
| 16:05 | 12 , 13 , 14 , 15 , 16 hundreds | |
| 16:08 | . 16 hundreds , mean 0.16 This is the 10th | |
| 16:14 | place . This is the hundreds place . So when | |
| 16:17 | you read it it's 1616 squares out of 100 . | |
| 16:21 | Is how much I keep whenever I start with this | |
| 16:23 | much and I chop it by this much . All | |
| 16:26 | right . Just like here , we had 20 squares | |
| 16:29 | . So it was 0.20 . So .2 times .8 | |
| 16:33 | is more than half of what I started with . | |
| 16:35 | And it comes out to be 0.16 . Again , | |
| 16:38 | we're going to be doing these by hand in a | |
| 16:40 | few lessons , showing how to do the multiplication here | |
| 16:42 | , we're just trying to understand what's going on . | |
| 16:45 | All right , let's take a look at the next | |
| 16:48 | two problems . We only have two more in this | |
| 16:50 | lesson here . We start out with 0.7 and we're | |
| 16:54 | not gonna cut it in half . We're gonna cut | |
| 16:56 | it less than half . 0.5 would be cutting in | |
| 16:59 | half . We're cutting it in less than that . | |
| 17:01 | We start out with 0.7 . So here's one out | |
| 17:04 | of 10 , here's two out of 10 , here's | |
| 17:07 | three , here's four out of 10 or 100.4 , | |
| 17:11 | here's 0.5 , here's 0.6 and here's finally 0.7 . | |
| 17:16 | So this purple shaded region represents how much we start | |
| 17:19 | with . Now we're chopping by something less than half | |
| 17:22 | . So we'll go over here and say three out | |
| 17:24 | of 10 were chopping by here's one out of 10.1 | |
| 17:28 | , here's two out of 10 or 100.2 , here's | |
| 17:31 | three out of 10 or 100.3 . This is what | |
| 17:33 | we're gonna use to chop what we have over here | |
| 17:36 | . So I'll just draw a little dotted line through | |
| 17:38 | here . This is how much we're going to keep | |
| 17:40 | , that's what we chop . So we will just | |
| 17:42 | extend this over here and then you can see of | |
| 17:44 | course it went 2.7 , so 1234567 columns . It | |
| 17:49 | kind of went to right here and then you can | |
| 17:51 | see if we just kind of like copy it here | |
| 17:55 | , we're gonna shade all of this right here , | |
| 17:59 | notice it's exactly this amount . This amount right here | |
| 18:06 | . This amount of stuff is what we're shading right | |
| 18:09 | here , we're just chopping it into 100 pieces . | |
| 18:11 | So we can express it better so we can express | |
| 18:14 | the amount better . How many squares out of 100 | |
| 18:17 | do we have ? 123456789 10 11 12 13 14 | |
| 18:22 | 15 16 17 18 1920 21 21 squares out of | |
| 18:28 | 121 out of 121 100 0.21 tense place , hundreds | |
| 18:36 | place . Read it together 2121 out of 100 . | |
| 18:40 | So 1000.7 times 0.3 . When we do by hand | |
| 18:44 | later , we'll find out that it comes out to | |
| 18:46 | exactly be 0.21 and that's what this is representing is | |
| 18:50 | we take this thing and we chop it by something | |
| 18:53 | just a little bit less than half . And we | |
| 18:55 | get A number of 0.21 , which represents about less | |
| 18:59 | than half . A little bit less than half of | |
| 19:01 | what we started with . All right , here's our | |
| 19:04 | last problem for this lesson . We're going to take | |
| 19:07 | 0.8 and we're gonna multiply by 0.4 . So we're | |
| 19:10 | going to start with this amount and we're going to | |
| 19:12 | chop it pretty close to to halfway , but not | |
| 19:16 | quite here . We were chopping by .3 here , | |
| 19:18 | we're going to chop a little bit more , but | |
| 19:20 | it's still not quite halfway . It's a little bit | |
| 19:23 | less than half . 0.5 would be chopping it in | |
| 19:26 | half . So let's represent 8/10 . Here's 1/10 0.1 | |
| 19:32 | here , 0.2 here , 0.3 here , 0.40 point | |
| 19:38 | 50.60 point seven and 08 So , this entire purple | |
| 19:47 | shaded area means 8/10 of a whole . It's less | |
| 19:51 | than a whole , it's 8/10 of a whole . | |
| 19:54 | Now this guy over here , we're chopping it by | |
| 19:56 | just a little bit less than half . So let's | |
| 19:58 | see out of 10 here , 0.1 here , 0.2 | |
| 20:03 | here , 0.3 or 3/10 . And here 0.4 , | |
| 20:08 | which is 4/10 . Notice that going one more up | |
| 20:11 | would be exactly half . This is just a little | |
| 20:13 | bit less than half . So then we will take | |
| 20:16 | and we will cut and literally chop this thing by | |
| 20:19 | that amount . And this is what the answer will | |
| 20:21 | be this much stuff . We start with this , | |
| 20:24 | we use this to chop it and this is all | |
| 20:26 | that we have left . It should be a little | |
| 20:28 | bit less than half of what we started . So | |
| 20:31 | we go over here , we can extend this line | |
| 20:33 | , see if I can make it line up . | |
| 20:35 | Exactly . Yeah . And then we need to go | |
| 20:37 | over to here as well and then we can start | |
| 20:39 | shading . So here is make sure I don't overshoot | |
| 20:42 | here . Yeah , it goes to this far uh | |
| 20:45 | like this , make sure we catch everything over here | |
| 20:48 | . And we were just basically shading what the answer | |
| 20:50 | is , which we already have , but now we're | |
| 20:52 | representing it in hundreds because uh we can represent the | |
| 20:57 | exact answer . Notice this is the answer . After | |
| 20:59 | we chopped it , we're just taking that and cutting | |
| 21:01 | the whole thing into 100 pieces to see how many | |
| 21:04 | we have . 12345678 9 , 10 11 12 13 | |
| 21:10 | 14 15 16 17 18 1920 21 22 23 24 | |
| 21:15 | 25 26 27 28 29 30 31 32 32 squares | |
| 21:20 | out of 100 is 0.32 This is the tense , | |
| 21:26 | this is the hundreds . Read it together , it's | |
| 21:27 | 32 out of 100 . So in this lesson we | |
| 21:32 | have learned , believe it or not , something really | |
| 21:34 | important . I do not care if you know that | |
| 21:37 | 0.8 times 0.4 is 0.32 point 32 I do not | |
| 21:41 | care if you know that 320.7 times 0.3 point 21 | |
| 21:45 | I don't care about that . I will show you | |
| 21:47 | how to write it down and calculate it in a | |
| 21:49 | few lessons . All I care about is you understand | |
| 21:52 | what's happening ? The first number is just something less | |
| 21:56 | than one . It's represented by a shaded region . | |
| 21:58 | The second number you multiply by is a chopping factor | |
| 22:02 | that tells you how much of the first thing we're | |
| 22:05 | basically going to chop and throw away . So if | |
| 22:07 | we start out with this much of something and we | |
| 22:09 | chop it by exactly one half . This represents one | |
| 22:12 | half . This represents the chopping factor , Then literally | |
| 22:15 | this is the answer , we take that answer and | |
| 22:18 | represented in hundreds . In this case we had 20 | |
| 22:20 | squares out of a total of 100 so the answer | |
| 22:23 | was 0.20 . If we take something and multiply by | |
| 22:27 | chopping factor larger than 0.5 , then we're chopping a | |
| 22:31 | larger amount and we're going to keep more than half | |
| 22:34 | of what we started with because we're chopping it by | |
| 22:36 | something bigger than one half . We count the squares | |
| 22:39 | get 10.16 squares out of 100 If we chop by | |
| 22:43 | something less than five , both of these cases here | |
| 22:45 | was we're chopping by three Here we're chopping by .4 | |
| 22:48 | . In both cases , we used it to just | |
| 22:51 | cut what we started with and then our answer is | |
| 22:54 | what's going on here , so when you're multiplying by | |
| 22:56 | decimals you're chopping , it's like you have an axe | |
| 22:59 | and you're cutting the tree down the chopping factor . | |
| 23:02 | The thing you're multiplying by is just telling you how | |
| 23:05 | much to chop away . That's it . As we | |
| 23:07 | go through the next lesson , we'll get a little | |
| 23:08 | more practice with these kinds of problems and then as | |
| 23:12 | we move beyond that We will , we will learn | |
| 23:16 | how to write these down and calculate the answer , | |
| 23:18 | but when you get the answer you'll know what it | |
| 23:20 | means . And again , as we said before , | |
| 23:22 | if you take something and multiply by .5 , you're | |
| 23:26 | cutting it exactly in half . If you multiply by | |
| 23:28 | something more and more and more than .5 , then | |
| 23:31 | you're going to keep more and more and more of | |
| 23:33 | what you started with Until you get to the point | |
| 23:35 | where you just multiply by one and then you keep | |
| 23:37 | everything 16 times one would be 16 . If you | |
| 23:40 | multiply by less than .5 , you get closer and | |
| 23:42 | closer to zero so that eventually if you multiply by | |
| 23:46 | zero you'll just get zero . So that's why I | |
| 23:48 | say we're multiplying by a chopping factor . Watch this | |
| 23:51 | a second time . I really think it's important . | |
| 23:53 | Move on to the next lesson . We'll do more | |
| 23:56 | practice with these pictures and then we'll start multiplying decimals | |
| 23:59 | by hand . |
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