Ratios and Ratio Tables - By Anywhere Math
Transcript
| 00:0-1 | Welcome to anywhere , Math . I'm Jeff , Jacobson | |
| 00:02 | . And today we're gonna talk about ratios before we | |
| 00:24 | get into an example , let's talk about what a | |
| 00:26 | ratio is . A ratio is pretty simple . It's | |
| 00:28 | just a comparison of two quantities . Uh And the | |
| 00:32 | thing is we can write ratios three different ways . | |
| 00:35 | So for example , if we're comparing A to B | |
| 00:39 | , I can write the ratio as A to B | |
| 00:45 | , right . I can spell out the word to | |
| 00:47 | A to B . I could also write it as | |
| 00:49 | a with a colon and I would read it as | |
| 00:54 | a to be as well , but I would use | |
| 00:56 | this colon to compare the two . Uh And then | |
| 00:59 | the third way I could write it as a fraction | |
| 01:01 | uh A to B would be a over B . | |
| 01:06 | Like that . So those are the three ways that | |
| 01:08 | we can write ratios . They would all be equivalent | |
| 01:11 | to each other . It doesn't matter which one you | |
| 01:13 | use . Um When we start getting into equivalent ratios | |
| 01:17 | and things like that . Oftentimes you'll write it as | |
| 01:20 | a fraction just because it makes it a little bit | |
| 01:23 | easier , but you've got three ways to do it | |
| 01:25 | now . Let's look at an example . All right | |
| 01:27 | , here's example one , right ? The following ratio | |
| 01:30 | . So for part a you're finding the ratio of | |
| 01:32 | the pennies to quarters . Uh Here's my coins over | |
| 01:36 | here , so all we need to do is find | |
| 01:38 | , well first , how many pennies are there ? | |
| 01:40 | Uh 12345 66 pennies . Then how many quarters we'll | |
| 01:51 | cue for quarters . So 123 4567 Looks like seven | |
| 01:59 | quarters . So I can write my ratio as six | |
| 02:03 | 2 7 . Or I could do six 27 like | |
| 02:07 | that . Or 6/7 . Any one of those three | |
| 02:11 | would work if you want to try the other three | |
| 02:14 | on your own . Go ahead , positive video and | |
| 02:16 | give them a try . But let's let's move on | |
| 02:19 | quarters . Two dimes . Same thing . We already | |
| 02:22 | know that there's seven quarters because we counted that before | |
| 02:25 | now . I just need to know how many times | |
| 02:27 | . Uh So 72 for dimes D . Right here | |
| 02:32 | . One 23 73 . Okay good . Next one | |
| 02:39 | dimes to total coins . Where again there were three | |
| 02:42 | dimes . So I have that now we're comparing to | |
| 02:45 | total coins . Well there were six pennies plus seven | |
| 02:51 | quarters so that's 13 plus three dimes gives me 16 | |
| 02:56 | . So Dimes to total coins would be 3 - | |
| 03:00 | 16 . Okay and the last one d pennies to | |
| 03:04 | total coins . Uh Again I know that there are | |
| 03:08 | six pennies because we found that earlier . So six | |
| 03:12 | to Total coins was 16 . Now here we can | |
| 03:20 | basically with ratios you know you can write it like | |
| 03:23 | a fraction infractions we can simplify same thing with ratios | |
| 03:27 | 6 - 16 . I could simplify as three 28 | |
| 03:36 | Okay . And these ratios are equivalent . Their equivalent | |
| 03:40 | ratios so either one of those would work . Here's | |
| 03:43 | one to try on your own example to use ratio | |
| 03:57 | tables to organize equivalent ratios . Uh So we're going | |
| 04:01 | to talk about more with equivalent ratios right here . | |
| 04:06 | And like we said in the first example it's basically | |
| 04:09 | like simply simplifying fractions right ? You have equivalent fractions | |
| 04:13 | . You can also have equivalent ratios . Uh And | |
| 04:16 | we're gonna use a ratio table like what you see | |
| 04:20 | here to help us kind of organize those . So | |
| 04:23 | first with a You can see we're comparing pens , | |
| 04:27 | two pencils for everyone . Pen we have three pencils | |
| 04:32 | . So the ratio of pens and pencils is 123 | |
| 04:35 | . That's uh in simplest form you can think of | |
| 04:39 | but we can make equivalent ratios by adding on more | |
| 04:44 | . So if we look to fill in this table | |
| 04:48 | . Well if what if I have two pens ? | |
| 04:51 | Well then how many pencils would I have if I'm | |
| 04:53 | keeping the same ratio ? If I'm doing an equivalent | |
| 04:56 | ratio Well If I add one here I would have | |
| 05:04 | to add three here because for every pen I get | |
| 05:09 | three pencils . So if I add one pen that | |
| 05:11 | means I add three pencils which would mean it would | |
| 05:14 | be too 26 uh Same thing here I added three | |
| 05:21 | more pencils and for every three pencils I add a | |
| 05:24 | pen So I would add one here and it would | |
| 05:28 | be three tonight . So 123226329 Those are all equivalent | |
| 05:34 | ratios . And it it should be familiar if you | |
| 05:37 | run it like a fraction one third to 63 nights | |
| 05:40 | . Those are all equivalent fractions . So the same | |
| 05:42 | kind of thing . So we can find our equivalent | |
| 05:45 | ratios by adding like we did there but part B | |
| 05:50 | . There's another way we could do it . We | |
| 05:51 | can also think using multiplication or division . uh for | |
| 05:56 | every four dogs there's six cats . So the ratio | |
| 05:59 | is 4-6 From 6 to 12 . I can use | |
| 06:04 | multiplication . Well I multiplied by two . So if | |
| 06:08 | I'm going to use multiplication or division , I do | |
| 06:11 | the same thing to both . Okay . Just like | |
| 06:14 | when you're doing uh fractions , anything you do to | |
| 06:17 | that denominator or numerator , you do the same thing | |
| 06:20 | . You denominator if it's multiplication or division . So | |
| 06:24 | for I'm also gonna multiply by two . So that | |
| 06:27 | would give me eight . 8 to 12 Is equivalent | |
| 06:32 | to 4 - six . Uh same thing here from | |
| 06:35 | 8 to 24 at times by three . So here | |
| 06:39 | I'm also times in by three . 12 times three | |
| 06:43 | is 36 . Okay , those are all equivalent ratios | |
| 06:48 | 4 to 68 to 12 and 24 to 36 . | |
| 06:51 | Okay . And I could also go the other way | |
| 06:53 | here . If you notice 4 to 6 We could | |
| 06:56 | simplify that . We could divide both of them by | |
| 06:59 | two And I would get 2-3 , which is also | |
| 07:02 | an equivalent ratio . Here's something to try on your | |
| 07:04 | own . Here's our last example example three , the | |
| 07:18 | label on the box of crackers says that there are | |
| 07:21 | 240 mg of sodium . That's just salt for every | |
| 07:25 | 36 crackers . How much sodium do you consume if | |
| 07:29 | you ate 15 crackers ? Now if you're thinking how | |
| 07:34 | can I go about solving this ? If you remember | |
| 07:35 | to the last example , uh we use ratio tables | |
| 07:39 | . So let's do the same thing here are ratio | |
| 07:43 | is 240 mg . Uh 2 36 crackers . So | |
| 07:47 | 242 36 . So on top I'll just do the | |
| 07:52 | sodium which was measured in milligrams compared with crackers . | |
| 08:02 | Yeah . Okay . And as always if you want | |
| 08:06 | to try this on your own , go ahead and | |
| 08:07 | posit . So 240 2 36 . Now I want | |
| 08:14 | to get to 15 crackers . Okay well yeah I | |
| 08:20 | can't just divide 36 by something to get to 15 | |
| 08:24 | . I mean I could but it wouldn't be very | |
| 08:26 | nice . Uh but if I look at this 240 | |
| 08:29 | and 36 I could simplify that . So maybe I'll | |
| 08:32 | do that first and that might help . Um the | |
| 08:35 | greatest common denominator , our greatest common factor of 240 | |
| 08:39 | and 36 is 12 . So if I divide that | |
| 08:43 | by 12 I get three . And if I divide | |
| 08:47 | 240 x 12 I get 20 . Okay , So | |
| 08:52 | same thing , I still don't have 15 crackers like | |
| 08:55 | I want . Uh but Three times five is 15 | |
| 08:59 | . So that would be nice if I just times | |
| 09:02 | that by five I get 15 . So to get | |
| 09:05 | my equivalent ratio I would do the same thing to | |
| 09:08 | the 2020 times five would give me Mhm . 100 | |
| 09:17 | . So the question yeah . How much sodium do | |
| 09:20 | you consume if you ate 15 crackers ? Well , | |
| 09:24 | the answer would just be you would or you would | |
| 09:27 | consume a 100 milligrams of sodium . Ok , here's | |
| 09:33 | another to try on your own . As always . | |
| 09:46 | Thanks for watching it . If you like this video | |
| 09:48 | , please stop scott . |
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