Solving Equations with Rational Numbers - By Anywhere Math
Transcript
| 00:0-1 | Welcome anywhere . Math . I'm Jeff Jacobson . And | |
| 00:02 | today we're gonna be solving equations with rational numbers . | |
| 00:06 | Let's get started . All right . Let's get into | |
| 00:26 | our first example part A negative three equals m minus | |
| 00:30 | eight . Now , just a quick reminder about solving | |
| 00:33 | equations . We're always trying to get the variable alone | |
| 00:36 | . That's our goal . And anything you do to | |
| 00:39 | one side you have to do to the other side | |
| 00:42 | to make sure that it stays equivalent . Now , | |
| 00:44 | if this is your first time solving equations , check | |
| 00:46 | out this video up here . Those are going to | |
| 00:49 | show you the basics today we're dealing with rational numbers | |
| 00:52 | as well . So there's going to be fractions , | |
| 00:54 | decimals and both positive and negative numbers . Let's get | |
| 00:57 | started . Them . We're trying to get the variable | |
| 00:59 | alone . Here's the variable M I'm not even going | |
| 01:02 | to worry about this side . I'm focusing here . | |
| 01:04 | Well M is being subtracted by eight so to get | |
| 01:07 | rid of that minus A . I do the inverse | |
| 01:09 | operation which is plus A Anything I do to one | |
| 01:13 | side and do the other plus a . To both | |
| 01:16 | sides that goes away I'm left with m equals negative | |
| 01:20 | three plus eight would be five . And always remember | |
| 01:23 | the nice thing about equations is that you can always | |
| 01:26 | check your answer . So if I want to check | |
| 01:30 | , all I do is substitute this five back in | |
| 01:34 | for em because I'm saying m is equal to five | |
| 01:37 | . So my check I'm saying is negative three . | |
| 01:40 | It's my question , is it equal to five minus | |
| 01:45 | eight ? And five minus eight is negative three which | |
| 01:48 | is equal to negative three ? So we're happy about | |
| 01:53 | that . Okay so there is my solution to that | |
| 01:56 | equation . Let's try B w plus three halves equals | |
| 01:59 | one half . Again I'm gonna focus where that variable | |
| 02:02 | is . We're adding three halves to it . So | |
| 02:04 | to get rid of that three halves I'm gonna subtract | |
| 02:07 | three halves from both sides . Those go away and | |
| 02:11 | I'm left with W equals one half minus three halves | |
| 02:15 | . If I want to show that work , if | |
| 02:17 | you're a little unsure one half minus three halves they | |
| 02:22 | already have common denominators which is really nice . So | |
| 02:25 | it basically is just one minus three in the numerator | |
| 02:29 | which is negative 2/2 Which is the same as -1 | |
| 02:35 | . So there is my solution . Here's something to | |
| 02:38 | try on your own . Get example to a company | |
| 02:45 | has a profit of $750 this week . This is | |
| 02:49 | $900 more than the profit P . Last week write | |
| 02:54 | an equation that can be used to find P . | |
| 02:56 | So when we have a word problem like this and | |
| 02:58 | we're trying to write an equation , the first thing | |
| 03:01 | we're looking for our keywords , right ? So if | |
| 03:03 | you look here hopefully more than jumps out at you | |
| 03:07 | . You also want to think , well we write | |
| 03:09 | an equation what's my variable is going to be ? | |
| 03:12 | Well they tell us the profit P . P . | |
| 03:14 | Is going to be the variable . So I'm gonna | |
| 03:15 | write P . Is my variable , and it's always | |
| 03:18 | important to know . Well what does that variable represents | |
| 03:20 | the profit P . Last week . So P . | |
| 03:23 | Represents the profit last week we know it's going to | |
| 03:27 | be an equation , so we're going to have an | |
| 03:28 | equal sign . Let's start to fill in the pieces | |
| 03:31 | . So company has a profit of $750 this week | |
| 03:34 | . This is $900 more than the profit P . | |
| 03:38 | From last week . Well more than is a keyword | |
| 03:42 | . And that means addition . So $900 plus P | |
| 03:46 | . Right ? More than means plus edition plus P | |
| 03:49 | . This is the profit last week , right ? | |
| 03:52 | Plus $900 is going to be equal to the profit | |
| 03:56 | from last week . 750 . So there is our | |
| 04:01 | equation . It didn't ask to solve it . So | |
| 04:03 | we're done there . Here's another problem to try on | |
| 04:04 | your own . Okay example three . We've got a | |
| 04:08 | couple more equations to solve . Let's get after it | |
| 04:11 | uh negative X over three equals negative six . Now | |
| 04:16 | with this when they write the negative in front it's | |
| 04:19 | hard to tell . Well is that negative on the | |
| 04:21 | X . The numerator or is it on the denominator | |
| 04:25 | ? And the truth is it doesn't matter . I | |
| 04:28 | can write this as a negative X over three or | |
| 04:33 | X over negative three . When I saw it I | |
| 04:37 | would get the same thing and I can prove it | |
| 04:39 | to you real quick . If I had it like | |
| 04:41 | this negative X . Over three equals negative six . | |
| 04:45 | Well then I would multiply both sides by three to | |
| 04:49 | get the X alone . But I have negative X | |
| 04:53 | . Still because that was a negative X . In | |
| 04:55 | the numerator equals negative 18 . Well then how do | |
| 05:00 | I make this chest X . Remember negative X . | |
| 05:03 | Is like a negative one X . So I could | |
| 05:06 | either multiply by negative or divide by a negative one | |
| 05:10 | to both sides . Either way it's basically just changing | |
| 05:13 | the side X equals 18 . If I did it | |
| 05:17 | where the negative is in the denominator I would get | |
| 05:21 | X over negative three equals negative six . And then | |
| 05:25 | I would do it in one step . Multiply both | |
| 05:27 | sides by negative three to get excellent . And I | |
| 05:29 | get X equals 18 . If you noticed there was | |
| 05:32 | one way that was one step quicker and that's this | |
| 05:36 | way when we do this problem just put the negative | |
| 05:39 | in the denominator so that when I multiply by negative | |
| 05:43 | three , the X . Is gonna be alone , | |
| 05:45 | there won't be a negative X . So again I'm | |
| 05:48 | trying to get the variable alone . So it's being | |
| 05:50 | divided by negative three . So to undo that division | |
| 05:54 | , I use the inverse operation which is multiple multiplication | |
| 05:57 | . Multiply both sides by -3 to keep it equivalent | |
| 06:01 | those cancel each other out . And I'm left with | |
| 06:04 | X equals negative times . Negative is going to be | |
| 06:07 | a positive 18 . And if I substitute that back | |
| 06:10 | in 18 divided by three is six . With that | |
| 06:13 | negative negative six equals negative six . Let's try the | |
| 06:16 | other one , 18 equals negative four . Why ? | |
| 06:19 | Again I'm concentrating on the variable Y . Is being | |
| 06:23 | multiplied by negative four . So to undo that I | |
| 06:26 | divide by negative four to both sides , those cancel | |
| 06:31 | out and I get why equals 18 divided by -4 | |
| 06:36 | . Just like we did here , We took the | |
| 06:39 | negative out from here and put it in the denominator | |
| 06:42 | . I can go the other way I can just | |
| 06:44 | take this negative and put it out front because I | |
| 06:46 | know that my answer is gonna be negative and then | |
| 06:49 | I can just worry about this 18/4 so I know | |
| 06:53 | it's gonna be negative 18/4 . We could simplify to | |
| 06:58 | nine halves but again that's an improper fraction . I | |
| 07:01 | don't want that . So I've got two options . | |
| 07:04 | I could write it as a mixed number or as | |
| 07:07 | a decima . Uh Me I'll just write it as | |
| 07:10 | a mixed number . So why equals 4.5 . Again | |
| 07:14 | you could have said why equals negative 4.5 . Here's | |
| 07:17 | something to try on your own . Alright example for | |
| 07:24 | it , this is our last example solve negative for | |
| 07:27 | fist . X equals negative eight . Same rules apply | |
| 07:31 | . I'm trying to get the variable alone X . | |
| 07:33 | Is being multiplied by negative four fists . So I | |
| 07:36 | should divide by negative four fist . But with fractions | |
| 07:40 | we know that divided by a fraction . It's the | |
| 07:43 | same thing as multiplying by its reciprocal so you can | |
| 07:48 | skip that dividing step and just multiply by the reciprocal | |
| 07:52 | . Reciprocal of negative for fist would be negative five | |
| 07:56 | . Force you just flip it so if I do | |
| 07:58 | that to both sides negative five fours times negative four | |
| 08:03 | fists X equals negative eight . Have to multiply this | |
| 08:08 | side by -5 . Force that cancels with that and | |
| 08:13 | that cancel that I'm left with x equals here . | |
| 08:18 | I would just make that as a fraction . Put | |
| 08:19 | it over one so it looks like a fraction I | |
| 08:22 | can remember that . This is in the numerator Simplify | |
| 08:26 | , that becomes one that becomes too so negative two | |
| 08:30 | times negative five would give me positive 10 . And | |
| 08:35 | that is my solution . Here's some to try on | |
| 08:38 | your own . Thanks so much for watching . And | |
| 08:45 | if you like this video please up scott . Mhm | |
| 00:0-1 | . |
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