Math Antics - Decimal Arithmetic - By
Transcript
| 00:03 | Uh huh . Hi I'm rob . Welcome to Math | |
| 00:07 | Antics in this lesson . We're going to learn about | |
| 00:10 | decimal arithmetic . But before we get started if you | |
| 00:13 | don't already know how to do multi digit arithmetic with | |
| 00:16 | regular whole numbers . Be sure to watch our videos | |
| 00:19 | that covered those subjects first . That's really important because | |
| 00:22 | I'm just going to show you how you can modify | |
| 00:25 | the procedures that we already learned in those videos so | |
| 00:28 | that they work for decimal numbers . So if you | |
| 00:30 | don't know how to do those procedures already , this | |
| 00:32 | video won't make very much sense . Specifically . You | |
| 00:36 | should make sure you've watched the videos about multi digit | |
| 00:38 | addition , subtraction , multiplication and long division . If | |
| 00:43 | you know how to do the problems in those videos | |
| 00:45 | then decimal arithmetic won't be too hard . That's because | |
| 00:48 | the procedures for decimal arithmetic are basically the same as | |
| 00:52 | they are for whole numbers but there's a few important | |
| 00:54 | differences that you need to know about and that's what | |
| 00:57 | I'm going to show you in this video . Are | |
| 00:58 | you ready ? Let's start with an easy one multi | |
| 01:01 | digit edition when adding multi digit whole numbers . The | |
| 01:05 | key was to stack the numbers up so that the | |
| 01:07 | ones place digits line up in a column which ensured | |
| 01:10 | that all the other number places lined up in columns | |
| 01:12 | to . Then you just add up the digits in | |
| 01:15 | each column starting with the ones place and working to | |
| 01:18 | the left . Well adding multi digit decimal numbers works | |
| 01:22 | the same way . The main difference is that instead | |
| 01:25 | of lining up the ones place digits . When we | |
| 01:27 | stack the numbers we line up the decimal points instead | |
| 01:30 | . But wait a minute . I mean isn't that | |
| 01:33 | the same thing as lining up the ones place digits | |
| 01:36 | ? Yes it is . And that's because the decimal | |
| 01:39 | is our reference mark that always goes between the ones | |
| 01:43 | place and the 10th place . So lining up the | |
| 01:46 | decimal points is the same thing as lining up the | |
| 01:49 | ones places . It makes sure all the number of | |
| 01:51 | places lined up in columns . Now you've probably noticed | |
| 01:55 | that decimal numbers can have different numbers of decimal digits | |
| 01:59 | for example 10.8 has only one decimal digit but 5.34 | |
| 02:05 | has two decimal digits . And what that means is | |
| 02:08 | that when you line up the decimal points of the | |
| 02:10 | two decimal numbers , they might not form a nice | |
| 02:13 | column on the right . Each . Some of the | |
| 02:15 | digits might be missing but that's no problem . Remember | |
| 02:19 | if there's not a digit in a particular number place | |
| 02:22 | you can just put a zero there to help you | |
| 02:23 | keep track of things . Now that these numbers are | |
| 02:26 | lined up by their decimal points we can add them | |
| 02:29 | , call them by column . But instead of starting | |
| 02:31 | with the ones place like we always did with whole | |
| 02:33 | numbers , we start with whatever number place column is | |
| 02:37 | the furthest to the right in this case that's the | |
| 02:39 | 100th place . So we'll start there So we add | |
| 02:43 | the digits in each column carrying or regrouping as needed | |
| 02:47 | and we get 1614 . So we're done right wrong | |
| 02:52 | . There's one last really important step . Remember ? | |
| 02:56 | We're doing decimal edition so we can't just forget about | |
| 02:59 | that decimal point . We need to bring a copy | |
| 03:01 | of it straight down into our answer line . So | |
| 03:03 | we keep the same reference point for our number of | |
| 03:06 | places . Now we can see that the answer is | |
| 03:09 | really 16.14 . That's not so hard is it ? | |
| 03:13 | And I've got more good news . Decimal subtraction works | |
| 03:16 | the same way you start by lining up the decimal | |
| 03:19 | points of the two numbers . Remember that the order | |
| 03:22 | of the numbers matters in subtraction so be sure that | |
| 03:24 | the number you're taking away is on the bottom . | |
| 03:27 | Then starting with whatever column is furthest to the right | |
| 03:30 | , you subtract the digits column by column , borrowing | |
| 03:33 | if you need to . After that you just bring | |
| 03:36 | down a copy of the decimal point and you have | |
| 03:38 | your answer . Okay so decimal addition and subtraction are | |
| 03:42 | pretty easy . Let's move on to something a little | |
| 03:44 | harder . Decimal multiplication Now as you know , multi | |
| 03:48 | digit multiplication is more complicated because there are so many | |
| 03:52 | multiplication steps . But the good news is that decimal | |
| 03:55 | numbers don't really make the procedure much harder than it | |
| 03:58 | is with whole numbers . That's because there's a clever | |
| 04:01 | way that we can make decimal multiplication look exactly like | |
| 04:05 | the multi digit multiplication with whole numbers that you already | |
| 04:08 | know how to do . The key is to pretend | |
| 04:11 | that the decimal points are not really there . Hold | |
| 04:14 | on a minute . I mean I like pretending as | |
| 04:16 | much as you do but if we just pretend that | |
| 04:19 | the decimal points aren't even there , we are going | |
| 04:21 | to get the right answer . Are we well know | |
| 04:24 | but the only thing that would be wrong with the | |
| 04:26 | answer is that the decimal point won't be in the | |
| 04:29 | right spot so we'll need to fix that at the | |
| 04:31 | end . I know it sounds a little confusing . | |
| 04:34 | So here's an example that should help you understand . | |
| 04:37 | I knew you would say that Let's say that you | |
| 04:41 | need to multiply 3.65 by 2.4 and that seems a | |
| 04:45 | little tricky . But what if we just pretend that | |
| 04:48 | the decimal points are not there for now ? In | |
| 04:50 | other words , what if we pretended that the numbers | |
| 04:53 | were 365 and 24 ? You already know how to | |
| 04:57 | do that problem ? You just follow the procedure that | |
| 04:59 | we learned in multi digit multiplication , part two and | |
| 05:02 | you get the answer 8760 But that's the answer to | |
| 05:08 | 365 times 24 , not 3.65 times 2.4 . So | |
| 05:14 | it's time to stop pretending to get the correct answer | |
| 05:17 | for the decimal problem . We've got to understand what's | |
| 05:20 | going on with those decimal points and why we just | |
| 05:22 | pretended they weren't there ? The truth is when we | |
| 05:25 | pretended that the decimal points weren't there , What we | |
| 05:28 | were really doing is pretending that they had been shifted | |
| 05:31 | until both of our numbers became whole numbers . Remember | |
| 05:35 | the numbers 365 and 24 technically do have decimal points | |
| 05:40 | there right there next to the ones place , we | |
| 05:42 | just don't need to show them since there aren't any | |
| 05:44 | decimal digits . So by ignoring the decimal points , | |
| 05:48 | what we were really doing is mentally shifting the decimal | |
| 05:51 | points to the right , We shifted the top decimal | |
| 05:53 | .2 places to the right and we shifted the bottom | |
| 05:56 | decimal .1 place to the right . But doing that | |
| 06:00 | changed the numbers , it made the top number 100 | |
| 06:03 | times bigger than the decimal version and it made the | |
| 06:05 | bottom number 10 times bigger . That's because every time | |
| 06:09 | you shift the decimal .1 number place to the right | |
| 06:13 | , it's like multiplying by a factor of 10 And | |
| 06:16 | that means the answer we got is way too big | |
| 06:19 | . It's too big by three factors of 10 because | |
| 06:23 | the decimal points in our problem got shifted a total | |
| 06:26 | of three places to the right , two on the | |
| 06:28 | top and one on the bottom . So to fix | |
| 06:31 | that we're going to have to shift the decimal point | |
| 06:33 | in our answer the same amount in the opposite direction | |
| 06:37 | . In other words we need to move the decimal | |
| 06:39 | point in our answer three places to the left which | |
| 06:42 | will make it smaller by three factors of 10 . | |
| 06:46 | So starting right here where the decimal point would be | |
| 06:49 | if our answer was 8760 , We shifted three places | |
| 06:54 | to the left and we end up with 8.760 or | |
| 06:58 | just 8.76 . And that is the answer to 3.65 | |
| 07:03 | times 2.4 . That's a cool trick . Huh ? | |
| 07:06 | It means that you can do decimal multiplication just like | |
| 07:09 | regular multi digit multiplication . You start by setting up | |
| 07:13 | your multiplication problem exactly like you would at the decimal | |
| 07:16 | points were invisible but don't just erase them because you'll | |
| 07:20 | need them at the end to figure out how many | |
| 07:22 | places to shift the decimal point in the answer . | |
| 07:25 | Then keep ignoring the decimal points . While you follow | |
| 07:29 | the multiplication procedure , once you have an answer count | |
| 07:33 | up how many places the decimal points are shifted and | |
| 07:36 | the problem you're working don't forget it's the total shift | |
| 07:40 | of both the top and bottom decimal points and then | |
| 07:44 | shift the decimal point and your answer to the left | |
| 07:47 | . That same number of places . So decimal multiplication | |
| 07:51 | turns out to be not too bad after all . | |
| 07:53 | But what about decimal division ? That's got to be | |
| 07:56 | hard . Right Well multi digit division is always a | |
| 07:59 | little hard but luckily decimals don't really make it very | |
| 08:03 | much harder . In fact it's only when there's a | |
| 08:06 | decimal divisor that the procedure is a little different . | |
| 08:09 | If you just have a decimal dividend and the divisor | |
| 08:12 | is a whole number . It's really simple . That's | |
| 08:15 | because you can just do the long division procedure that | |
| 08:18 | we learned in the long division videos and the decimal | |
| 08:20 | point doesn't affect it at all . You just need | |
| 08:23 | to make sure that you bring a copy of the | |
| 08:25 | decimal point up into the answer line when you're done | |
| 08:28 | . So if you have the division problem 12.64 divided | |
| 08:32 | by four . You would follow the division procedure as | |
| 08:35 | if the decimal point was not even there and you'd | |
| 08:37 | get 316 and the answer line . But then you | |
| 08:41 | need to bring a copy of the decimal point straight | |
| 08:44 | up into the final answer , making it 3.16 . | |
| 08:49 | That's all there is to it . If it's only | |
| 08:51 | the dividend , that's a decimal number . But what | |
| 08:54 | if both the divisor and the dividend or decimals ? | |
| 08:58 | Like what if you have to divide 6.45x1.5 ? Well | |
| 09:03 | the first step is don't panic as you'll see this | |
| 09:06 | isn't much harder . It turns out that there's a | |
| 09:09 | very simple trick that we can use to make it | |
| 09:12 | . So our divisor is not a decimal number . | |
| 09:14 | We can just shift the decimal point in the divisor | |
| 09:17 | to the right until it's a whole number . But | |
| 09:20 | if we do that then we also need to shift | |
| 09:22 | the decimal in the dividend the same amount to the | |
| 09:25 | right . So in this case if we want to | |
| 09:28 | shift the decimal point in our divisor one place to | |
| 09:30 | the right so that it's 15 , we can do | |
| 09:33 | that as long as we also shift the decimal point | |
| 09:36 | in the dividend by the same amount , which will | |
| 09:38 | turn it into 64.5 . And here's the really cool | |
| 09:42 | part . If we do this new division problem , | |
| 09:44 | 64.5 divided by 15 will get exactly the same answer | |
| 09:49 | we would have if we did the problem 6.45 divided | |
| 09:53 | by 1.5 . That only works because we shifted the | |
| 09:57 | decimal point in the divisor and the dividend by the | |
| 10:00 | same amount in the same direction . And you'll realize | |
| 10:04 | why that works . If you remember equivalent fractions , | |
| 10:07 | think about the fraction 1/2 . That's the same as | |
| 10:11 | one , divided by two . Right , Okay . | |
| 10:14 | But what if I multiplied both the top and bottom | |
| 10:17 | number by 10 ? That would give me 10/20 which | |
| 10:20 | is equivalent to 1/2 . Even though it uses different | |
| 10:24 | top and bottom numbers , Both represent the value 1/2 | |
| 10:28 | their equivalent fractions . Well , that's what we did | |
| 10:32 | in our decimal division problem when we shifted the decimal | |
| 10:35 | point in both the divisor and the dividend by one | |
| 10:38 | place , we multiplied each number by 10 . And | |
| 10:42 | since fractions and division are basically the same , we | |
| 10:45 | made equivalent division problems but now one of them has | |
| 10:49 | a whole number . Divisor . Pretty cool . Huh | |
| 10:53 | ? That means if we solve 64.5 divided by 15 | |
| 10:56 | , we get the answer 4.3 which is exactly the | |
| 11:00 | same answer we would get if we did 6.45 divided | |
| 11:03 | by 1.5 . And you can use that trick to | |
| 11:07 | avoid ever having to divide with the decimal device er | |
| 11:10 | , Even if the dividend is a whole number , | |
| 11:12 | for example if you have the problem 148 divided by | |
| 11:16 | 1.6 you can shift the decimal in both the divisor | |
| 11:20 | and the dividend one place to the right . Remember | |
| 11:23 | there's always a decimal point , even in a whole | |
| 11:26 | number , it's just that when you shift it to | |
| 11:28 | the right , you need to put a zero in | |
| 11:30 | the place that it shifts past . That gives you | |
| 11:33 | the equivalent division problem 1480 divided by 16 . And | |
| 11:38 | since these division problems are equivalent , you'll get the | |
| 11:41 | same answer for both . All right . So that's | |
| 11:44 | how you can modify all the traditional arithmetic procedures to | |
| 11:47 | work with decimal numbers . It can be a little | |
| 11:50 | tricky at first , since there's a few extra steps | |
| 11:52 | that you have to keep track of when the numbers | |
| 11:54 | or decimals . But if you practice a lot and | |
| 11:56 | check your answers with a calculator , you'll get it | |
| 11:59 | remember . You can always re watch this video if | |
| 12:02 | you need to go along with the other videos about | |
| 12:04 | multi digit arithmetic . As always . Thanks for watching | |
| 12:07 | Math Antics and I'll see you next time learn more | |
| 12:11 | at Math Antics dot com . |
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