Math Antics - Common Denominator LCD - By mathantics
Transcript
| 00:03 | uh huh . In the last video we learned how | |
| 00:07 | to find what I like to call the easiest common | |
| 00:10 | denominator . And personally I prefer to use that method | |
| 00:13 | of getting a common denominator whenever I can because it's | |
| 00:16 | quick and easy to remember but I can think of | |
| 00:19 | at least two cases where it would be better to | |
| 00:21 | use a different method to convert unlike fractions into like | |
| 00:23 | fractions . The first case is when one of the | |
| 00:27 | fractions bottom numbers is a multiple of the other fractions | |
| 00:30 | bottom number . And the second case is when your | |
| 00:32 | teacher says that you have to use this other method | |
| 00:35 | . This new method is called finding the least common | |
| 00:38 | denominator because it involves using the smallest common denominator . | |
| 00:42 | We can find instead of just using the product of | |
| 00:44 | the bottom numbers like we did in the first method | |
| 00:47 | to find the smallest or at least common denominator of | |
| 00:51 | two fractions , we need to figure out what the | |
| 00:53 | smallest or at least common multiple of the two bottom | |
| 00:56 | numbers is now in case you've forgotten a multiple of | |
| 00:59 | a number is just the result of multiplying it by | |
| 01:02 | another whole number like 12 or three . So here's | |
| 01:06 | what we're gonna do to find the least common denominator | |
| 01:08 | or L . C . D . For short . | |
| 01:10 | First we'll take the two different bottom numbers and start | |
| 01:14 | making multiples of each of them . We start with | |
| 01:16 | one times the numbers and then two times and then | |
| 01:19 | three times and four times and so on . It | |
| 01:23 | helps to arrange these multiples in a small table almost | |
| 01:26 | like a scoreboard so that you can keep things organized | |
| 01:28 | and easy to find . We'll stop making multiples as | |
| 01:31 | soon as we find an answer , that's the same | |
| 01:33 | for both numbers . That answer is called the least | |
| 01:36 | common multiple and it will become our new common denominator | |
| 01:40 | . Once we know what the least common denominator is | |
| 01:42 | , we have to figure out which whole fractions will | |
| 01:45 | need to multiply our unlike fractions by to get equivalent | |
| 01:48 | fractions with that common denominator . The solution is to | |
| 01:52 | use the same numbers that resulted in the common multiple | |
| 01:55 | . For example , if you multiplied by four to | |
| 01:58 | get the common multiple for the first , unlike fraction | |
| 02:01 | , then you'll use 4/4 as your whole fraction . | |
| 02:04 | And if you multiplied by three to get the common | |
| 02:07 | multiple for the second , unlike fraction , then you'll | |
| 02:09 | use 3/3 as your whole fraction for it . Have | |
| 02:13 | I lost you yet ? Should make a lot more | |
| 02:15 | sense . After you've seen a few examples , let's | |
| 02:17 | start with this problem . 3/8 plus 5/24 . Step | |
| 02:22 | one is to take our two bottom numbers and make | |
| 02:25 | multiples of them to see if we can find a | |
| 02:27 | common multiple First . Let's multiply them both by what | |
| 02:30 | ? Well , that's easy . We have eight and | |
| 02:32 | 24 . Next we multiply them both by two and | |
| 02:35 | that gives us 16 and 48 . I still don't | |
| 02:38 | see anything in common . So let's multiply them both | |
| 02:40 | by three . Three times eight is 24 3 times | |
| 02:44 | 24 is 72 . But look , we have something | |
| 02:47 | in common . Now we have a 24 in each | |
| 02:49 | column . We have found the least common multiple of | |
| 02:52 | the numbers eight and 24 . And it happens to | |
| 02:55 | be 24 . That makes sense if you remember your | |
| 02:57 | multiplication tables that three times 8 equals 24 . So | |
| 03:02 | now we know we're going to use 24 as a | |
| 03:04 | common denominator . But what whole fractions do we need | |
| 03:07 | to get it ? The answer lies in our multiples | |
| 03:09 | chart to get our common multiple . We had to | |
| 03:12 | multiply our eight by three . So we're going to | |
| 03:14 | use the whole fraction 3/3 for our first fraction And | |
| 03:19 | our common multiple for 24 was just itself . We | |
| 03:22 | multiplied by one . So we could use the whole | |
| 03:24 | fraction 1/1 . But we really don't need to sense | |
| 03:28 | multiplying by one . Won't change anything . We already | |
| 03:31 | have the denominator of 24 on that side , so | |
| 03:34 | we don't need to change it . Okay , now | |
| 03:36 | we multiply on top three times three gives us nine | |
| 03:40 | and on the bottom eight times three gives us 24 | |
| 03:43 | just like we wanted . Now we have like fractions | |
| 03:46 | and we can use our simple procedure to add them | |
| 03:48 | . We add the top number's nine plus five equals | |
| 03:51 | 14 . And we keep the same bottom number . | |
| 03:53 | 24 . Okay . Ready for one more example , | |
| 03:57 | let's find the L C D for these fractions to | |
| 04:00 | over nine and 7/12 . Again , let's start by | |
| 04:04 | making a list of multiples for our two bottom numbers | |
| 04:07 | . To look for a common multiple . Nine times | |
| 04:09 | one is nine and 12 times one as 12 . | |
| 04:12 | Of course nine times two is 18 and 12 times | |
| 04:16 | two is 24 . Nine times three is 27 12 | |
| 04:20 | times three is 36 . 9 times four is 36 | |
| 04:24 | . Ha ha we found it . 36 is the | |
| 04:27 | least common multiple of nine and 12 . So we'll | |
| 04:30 | use that as our common denominator . Now let's figure | |
| 04:33 | out which whole fractions we need to use to make | |
| 04:36 | our fractions have that denominator . We use 4/4 for | |
| 04:39 | our first unlike fraction since four times nine was 36 | |
| 04:43 | we use 3/3 for our second . Unlike fraction because | |
| 04:46 | three times 12 was 36 there . Now when we | |
| 04:50 | multiply we get to new but equivalent fractions that have | |
| 04:54 | a common denominator . Now we can add them with | |
| 04:56 | our simple procedure on the top eight plus 21 equals | |
| 05:00 | 29 we keep the same bottom number 36 . So | |
| 05:04 | that's how you use at least common denominator method . | |
| 05:07 | And it's really not that hard once you get the | |
| 05:09 | hang of it . So don't forget to do the | |
| 05:11 | exercises for this video , because the way to really | |
| 05:14 | learn math is to do it . Good luck . | |
| 05:16 | And I'll see you next time learn more at math | |
| 05:20 | Antics dot com . |
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