Prime Factorization - By Anywhere Math
Transcript
| 00:0-1 | I have 24 deaths in my classroom . And at | |
| 00:02 | the beginning of every year , I try to figure | |
| 00:05 | out how I want to group them . If every | |
| 00:07 | group needs the same number of deaths , how many | |
| 00:10 | different arrangements can I make ? Welcome to anywhere . | |
| 00:31 | Math . I'm Jeff , Jacobson . And today we're | |
| 00:33 | gonna talk about prime factor ization . Okay . How | |
| 00:38 | am I going to arrange those deaths ? So remember | |
| 00:42 | I've got 24 total . Okay . And there's a | |
| 00:47 | lot of different options . I have . Uh , | |
| 00:50 | first I could put everybody together in one big group | |
| 00:53 | . Right ? I could have one group of 24 | |
| 00:59 | . I probably wouldn't do that . But I could | |
| 01:01 | , if I wanted , uh , I could split | |
| 01:03 | them in half . I could do to groups of | |
| 01:09 | 12 each . I could do Three groups of eight | |
| 01:18 | . So eight per group . That's not terrible . | |
| 01:22 | It's still pretty big . I can also do four | |
| 01:25 | groups of six . four times 6 is 24 . | |
| 01:33 | Um , what I just listen here are called factor | |
| 01:36 | parents . Uh , if you notice each one of | |
| 01:39 | these numbers are a factor of 24 , right ? | |
| 01:43 | 24 is divisible by 123468 12 , and 24 . | |
| 01:48 | They're all factors and we listed them in paris . | |
| 01:52 | So if you were going to find , if you | |
| 01:54 | see a problem that's asking about factor pairs , that's | |
| 01:57 | what you do . You list them in paris and | |
| 02:00 | it's good to go in order . Always start with | |
| 02:02 | one . One is always a factor of every number | |
| 02:05 | . So start with one and then go in that | |
| 02:08 | order , notice I did one and then 234 And | |
| 02:11 | then I got to six . You can stop when | |
| 02:13 | it starts to repeat . But for us for this | |
| 02:16 | problem I have some other options . I could do | |
| 02:20 | four groups of six , but then I can also | |
| 02:23 | do the opposite of that . I can also do | |
| 02:25 | mhm . six groups of four . Yeah . Instead | |
| 02:33 | of three groups of eight , I could do eight | |
| 02:35 | groups of only three deaths . Eight groups of three | |
| 02:42 | same thing here . Instead of just two big groups | |
| 02:46 | of 12 deaths , I could do 12 groups of | |
| 02:49 | only two people , basically Putting them in Paris , | |
| 02:52 | 12 groups of two , which are just people in | |
| 03:00 | Paris . Um And then finally , Instead of one | |
| 03:04 | big group of 24 , I could do 24 groups | |
| 03:08 | of just one person . So basically everyone is by | |
| 03:11 | themselves . So there really aren't any groups 24 groups | |
| 03:14 | of one . Okay , so that's everybody by themselves | |
| 03:21 | . So the question was , how many different arrangements | |
| 03:24 | can I make ? Uh well 12345678 So the answer | |
| 03:31 | I can make eight arrangements . That's for that . | |
| 03:37 | Right , Okay . Let's try an example with factor | |
| 03:40 | pairs . So example , one list the factor pairs | |
| 03:42 | of 56 Factor pairs . All you're looking for are | |
| 03:46 | factors and we're writing them in pairs . Uh remember | |
| 03:49 | factors you can think of , well what numbers is | |
| 03:52 | 56 divisible by ? Uh what number goes into 56 | |
| 03:56 | evenly ? That's those are your factors . And like | |
| 03:59 | I said before , always start with one , One | |
| 04:02 | is always going to be a factor and we're lifting | |
| 04:04 | them as pairs . So one times what is 56 | |
| 04:08 | ? Well one times 56 Is . 56 . is | |
| 04:12 | also a factor , right ? Uh and then just | |
| 04:15 | go in order . It's an even number so too | |
| 04:18 | is gonna work too , is a factor Uh two | |
| 04:21 | and 28 . three is not if you know you're | |
| 04:26 | the visibility rules , The sum of the digits is | |
| 04:29 | 11 . That's not divisible by three , so three | |
| 04:32 | doesn't work . How about Four , wow , four | |
| 04:36 | is a factor of 56 . 456 , it goes | |
| 04:41 | 14 times four times 14 is 56 . Uh five | |
| 04:47 | doesn't work because this last digit doesn't end in a | |
| 04:50 | five or a zero . Uh six doesn't work because | |
| 04:54 | we needed a three as a factor Uh if six | |
| 04:58 | was gonna work Uh seven , hopefully , you know | |
| 05:01 | , seven times 8 is 56 . So seven and | |
| 05:05 | 8 is another factor pair . Uh and then we're | |
| 05:09 | done . Once you get to a number that you've | |
| 05:11 | already got nine , know nothing else . Right ? | |
| 05:14 | So these are our factor pairs . Now try some | |
| 05:17 | on your own . All right , let's look at | |
| 05:24 | example two . It says right , the prime factor | |
| 05:27 | ization of 48 . Well , first , let's talk | |
| 05:30 | about what that means . Prime factor Ization . Prime | |
| 05:34 | factor Ization of a number is just when you write | |
| 05:37 | a number written . Mhm . As the troops As | |
| 05:47 | the product of its prime factors . Okay , privatization | |
| 06:02 | of a number is just a number written as the | |
| 06:04 | product of its prime factors . You can look if | |
| 06:07 | you remember prime prime numbers are those that are only | |
| 06:10 | divisible by one in itself . Uh and factories ation | |
| 06:14 | your listing the factors , the prime factors . So | |
| 06:17 | that if you just remember that , look at the | |
| 06:19 | word , you can hopefully remember what you need to | |
| 06:22 | do . So basically what we need to do is | |
| 06:26 | list of factors until we get all prime numbers . | |
| 06:29 | That's basically what we do . So let's try it | |
| 06:32 | . And again , if you think you know how | |
| 06:33 | to do it on your own , go for it | |
| 06:35 | . Uh So first when you're starting out a good | |
| 06:40 | way to do it is use a factor tree . | |
| 06:42 | Uh basically we just start writing factors and it looks | |
| 06:45 | kind of like a tree . Um there's lots of | |
| 06:49 | ways we can start uh we can start with two | |
| 06:52 | and 24 we can start with six and eight . | |
| 06:56 | Uh We could do four and 12 . It doesn't | |
| 07:00 | really matter how you start , it's up to you | |
| 07:03 | if you have an even number , a lot of | |
| 07:05 | people like to start with to , you know , | |
| 07:07 | to is a factor . Okay ? And two times | |
| 07:14 | uh 24 . Okay , So there's our factor pair | |
| 07:19 | just like what we did before two times 24 . | |
| 07:21 | Well two is a prime number , so that's done | |
| 07:27 | . We're not going to factor that anymore , you | |
| 07:30 | really can unless you just do two in one , | |
| 07:32 | but that's not going to help anything . So we're | |
| 07:35 | done with that . So now 24 isn't prime , | |
| 07:38 | it's composite , it still has other factors besides one | |
| 07:42 | in itself , so we're going to keep going um | |
| 07:45 | and it's even so I can do to again two | |
| 07:48 | times 12 , Two and 12 are both factors of | |
| 07:52 | 24 and again two is prime . So we're done | |
| 07:57 | with that . I'm going to circle it . Remember | |
| 08:00 | we're just trying to find all the factors until we | |
| 08:03 | get to all prime factors . 12 is not prime | |
| 08:07 | . It's composite . So we're going to keep going | |
| 08:09 | . It's even so I can do to again two | |
| 08:12 | times six . No , there's another two that's prime | |
| 08:17 | . So it's done . Six is still composite . | |
| 08:20 | So we're not done with that . So finally running | |
| 08:24 | out of room a little bit too , times three | |
| 08:29 | is six . Those are two factors of six and | |
| 08:33 | two and 3 are both prime numbers . So I'm | |
| 08:36 | going to circle that . And now , once there's | |
| 08:41 | no more composite numbers , You're done . So my | |
| 08:45 | prime factor ization of 48 is two times two times | |
| 08:53 | 22 times two times two . You're just following all | |
| 08:55 | the ones that you circled times two Times three . | |
| 09:01 | That's the prime factor Ization Of 48 . Remember ? | |
| 09:05 | It's the product of all its prime factors . Product | |
| 09:08 | meaning multiplication . Right ? Those are all the prime | |
| 09:12 | factors . Now , we can shorten this . Hopefully | |
| 09:16 | you remember if we've got repeated multiplication instead of two | |
| 09:20 | times two times two times two , we can use | |
| 09:22 | exponents if you remember a couple of videos ago , | |
| 09:25 | so we can write that as 2 to the 4th | |
| 09:28 | . Yeah , Times three . It's a little simpler | |
| 09:31 | . Either one is correct . This one is maybe | |
| 09:35 | just a little easier to read . So that is | |
| 09:37 | the prime factor ization of 48 . Here's some to | |
| 09:40 | try on your own . Thanks for watching . And | |
| 09:48 | if you like this video , please subscribe . |
Summarizer
DESCRIPTION:
OVERVIEW:
Prime Factorization is a free educational video by Anywhere Math.
This page not only allows students and teachers view Prime Factorization videos but also find engaging Sample Questions, Apps, Pins, Worksheets, Books related to the following topics.
GRADES:
STANDARDS:
