Math Antics - Rounding - By
Transcript
| 00:03 | Uh huh . Hi , welcome to Math Antics . | |
| 00:08 | In this video , we're going to learn about an | |
| 00:09 | important math concept called Rounding . To help you understand | |
| 00:14 | what rounding is . Let's think about how numbers are | |
| 00:16 | usually used most of the time numbers are used to | |
| 00:19 | represent amounts of things like how many miles it is | |
| 00:22 | to the supermarket or how many days until your birthday | |
| 00:25 | or how many students went to your high school ? | |
| 00:28 | How many students went to my high school ? Oh | |
| 00:31 | about 2000 . Okay . But it wasn't exactly 2000 | |
| 00:36 | was it ? Well no , it was more like | |
| 00:38 | 1900 . Ah but it probably wasn't exactly 1900 either | |
| 00:44 | , was it ? Well no , it was more | |
| 00:47 | like 1860 . All Right Fine 1863 . See what | |
| 00:55 | I did there at first the number used to represent | |
| 00:58 | the students at high school was a round number . | |
| 01:00 | It was a good estimate of how many students there | |
| 01:02 | were , but it wasn't exact . The next two | |
| 01:05 | numbers were a little closer to the truth , but | |
| 01:07 | they were still estimates . Only the final number represented | |
| 01:10 | the exact amount of students at the school . All | |
| 01:14 | three of the estimates are rounded versions of the exact | |
| 01:17 | count , but they have different levels of precision . | |
| 01:19 | 1860 was the most precise estimate , and 2000 was | |
| 01:24 | the least precise estimate . So rounding a number basically | |
| 01:29 | means making a less precise version of it . And | |
| 01:31 | as you can see , there's usually multiple ways to | |
| 01:34 | round a number depending on the level of precision that | |
| 01:36 | you need . A really good way to understand what's | |
| 01:39 | going on . When you round a number is to | |
| 01:41 | look at a number line , here's 1,863 . If | |
| 01:46 | we want to round it to the nearest 10 , | |
| 01:48 | we need to decide if it goes up to 1870 | |
| 01:52 | , or down to 1860 . But if we want | |
| 01:56 | to round it to the nearest 100 , we need | |
| 01:58 | to decide if it goes up to 1900 or down | |
| 02:02 | to 1800 . And if we want to round it | |
| 02:05 | to the nearest 1000 , we need to decide if | |
| 02:08 | it goes up to 2000 or down to 1000 . | |
| 02:11 | And in each case the decision was based on which | |
| 02:14 | round number was closer to the original exact number , | |
| 02:19 | but you might be wondering why would we ever want | |
| 02:22 | to make a number less precise in the first place | |
| 02:25 | ? What is rounding good for ? Well rounded numbers | |
| 02:29 | can often make them a lot easier to do calculations | |
| 02:31 | with . Like it would be a lot easier to | |
| 02:34 | quickly add 305 100 Then it would be to add | |
| 02:38 | 312 and 498 . Or sometimes you just don't need | |
| 02:43 | very much precision . Like you might not need to | |
| 02:46 | know that your dog weighs 55.83297 kg 55.8 kg might | |
| 02:54 | be precise enough . And some numbers like repeating decimals | |
| 02:58 | or irrational numbers have to be rounded off because we | |
| 03:01 | can't just keep writing decimal digits forever . Okay , | |
| 03:05 | now that you know what rounding is and why we | |
| 03:07 | do it for the rest of this video , we're | |
| 03:09 | going to focus on learning the procedure we follow to | |
| 03:12 | round off a number . Do you remember how our | |
| 03:15 | number system is based on digits and number of places | |
| 03:18 | ? Each digit of a number occupies a particular number | |
| 03:21 | . Place in each number place is named according to | |
| 03:24 | the amount it represents or counts . And it's important | |
| 03:28 | to know those names whenever you're rounding a number Because | |
| 03:30 | you'll usually be asked around to a specific number of | |
| 03:33 | place . For example , you may be asked around | |
| 03:35 | a number to the nearest 10 or the nearest 100 | |
| 03:39 | Or you might be asked around a number off to | |
| 03:41 | the nearest 10th or 10th . You may even be | |
| 03:44 | asked around to the nearest whole number , which is | |
| 03:46 | another way of asking you to round to the ones | |
| 03:48 | place . Okay , so when you're asked around a | |
| 03:51 | number , the first step is to pay very close | |
| 03:54 | attention to which number place you need to round two | |
| 03:57 | . That number place is important because it represents the | |
| 03:59 | smallest unit of counting that you're going to keep in | |
| 04:02 | your rounded version of the number . In fact , | |
| 04:05 | that number of place and the digit inside it is | |
| 04:08 | so important that I'm going to give it a special | |
| 04:10 | name just for this video . Let's call it the | |
| 04:13 | Target . As I mentioned , rounding a number means | |
| 04:16 | making a new less precise version of it in that | |
| 04:20 | new number , any digits that are a number of | |
| 04:22 | places smaller than the Target will automatically get replaced with | |
| 04:26 | zeros . And in most cases any digits that are | |
| 04:29 | a number of places larger than the Target will automatically | |
| 04:32 | be kept the same in the new rounded version . | |
| 04:35 | There are some exceptions as we'll see later in this | |
| 04:37 | video . So that seems pretty simple . All the | |
| 04:40 | bigger digits you keep and all the smaller digits zero | |
| 04:43 | . But what about that target digit itself ? What | |
| 04:46 | do we do with that ? Well , we're going | |
| 04:48 | to do one of two things . We're either going | |
| 04:50 | to keep that digit the same or we're going to | |
| 04:53 | increase it by one . If we keep that target | |
| 04:56 | digit the same , that's called rounding down . Which | |
| 04:59 | might seem strange at first . I mean how can | |
| 05:02 | leaving the digit the same be rounding down ? But | |
| 05:05 | remember we're going to automatically replace all of the smaller | |
| 05:09 | places with zero . And doing that makes surrounded number | |
| 05:12 | smaller . Even if the target digits stays the same | |
| 05:16 | . On the other hand , increasing the target digit | |
| 05:19 | by one is called rounding up since the new rounded | |
| 05:22 | number will be larger than the original number . All | |
| 05:25 | right . But how do we decide which to do | |
| 05:28 | ? How do we know if we keep the target | |
| 05:29 | digit the same or increase it by one ? The | |
| 05:33 | key is to look at the digit in the next | |
| 05:35 | smaller number . Place the digit that's just to the | |
| 05:38 | right of the target digit . If that digit is | |
| 05:41 | less than five . In other words if it's a | |
| 05:43 | 0123 or four , then we'll leave the target digit | |
| 05:48 | the same in the rounded version . But if the | |
| 05:51 | digit is a five or greater 5678 or nine , | |
| 05:56 | then we'll increase the target digit by one . Okay | |
| 06:00 | , so now that you know the basic procedure for | |
| 06:03 | rounding numbers , let's try a few specific examples . | |
| 06:06 | Here's the first one . Round 24623 to the nearest | |
| 06:12 | 100 . Since we need to round to the nearest | |
| 06:15 | 100 we first need to identify the digits in the | |
| 06:17 | hundreds . Place that digit is a six so that's | |
| 06:21 | our target and we know that any digits to the | |
| 06:23 | right of the target will be replaced with zeros and | |
| 06:26 | are rounded version . Next , let's decide what to | |
| 06:29 | do with the target digit . We either keep it | |
| 06:32 | the same or we increase it by one . To | |
| 06:35 | decide , we look at the value of the next | |
| 06:37 | digit to the right since that digit is only a | |
| 06:40 | two which is less than five . We round down | |
| 06:43 | which means that we'll keep the target digit the same | |
| 06:46 | in the rounded number last we just keep all the | |
| 06:49 | digits and bigger number places the same in the rounded | |
| 06:52 | version There we've rounded the original number to the nearest | |
| 06:56 | 100 the answer is 24,600 . Let's try another problem | |
| 07:02 | . This one has some decimal digits 32.725 and were | |
| 07:07 | asked to round it to the nearest whole number . | |
| 07:09 | That means our target digit is in the ones place | |
| 07:12 | we need to round it to the nearest one . | |
| 07:15 | So any digits to the right of the ones place | |
| 07:17 | will just be replaced with zeros in the rounded version | |
| 07:21 | . Now to decide what to do with the target | |
| 07:23 | digit , we look at the next digit to the | |
| 07:25 | right since that digit is a seven will round up | |
| 07:28 | this time . That means we'll increase our target digit | |
| 07:31 | by one and finally we keep any digits to the | |
| 07:35 | left of the target digit the same in this case | |
| 07:38 | , that's just the three . So we've rounded this | |
| 07:40 | number off to 33.0 or just 33 . Since we | |
| 07:45 | don't really need those extra zeros after the decimal point | |
| 07:48 | Ready for one more let's round 65.7991 to the nearest | |
| 07:54 | 100th . The first step is to identify the hundreds | |
| 07:57 | place as our target . That place contains the Digit | |
| 08:00 | nine . All the digits in smaller number of places | |
| 08:03 | will just be replaced with zero and the rounded version | |
| 08:07 | . Next we need to decide if we leave the | |
| 08:09 | target digit the same or increase it by one . | |
| 08:11 | So we look at the digit to the right of | |
| 08:13 | the target , it's A nine also so we'll definitely | |
| 08:16 | be rounding up . But since the target digit is | |
| 08:19 | already a nine , raising it by one is a | |
| 08:22 | little more complicated . When you add one to a | |
| 08:25 | digit that's already nine , you need to change it | |
| 08:27 | to zero and increase the digit in the next bigger | |
| 08:30 | number . Place by one . So that means that | |
| 08:33 | our target digit will become zero and we need to | |
| 08:36 | increase the digit in the next bigger number . Place | |
| 08:38 | that digit is a seven so we'll increase it to | |
| 08:40 | an eight . The rest of the digits in the | |
| 08:43 | original number will be kept the same in the rounded | |
| 08:45 | version . So are rounded version will be 65.80 . | |
| 08:50 | As you can see in some cases rounding can actually | |
| 08:53 | change the digits to the left of the target digit | |
| 08:55 | . Also it's sort of a domino effect that can | |
| 08:58 | happen when rounding numbers . Mhm . If you have | |
| 09:14 | a lot of nines Rounding can bump them all up | |
| 09:17 | like a chain reaction . Like what if you need | |
| 09:19 | to round 1,999,999 to the nearest 10 . The nine | |
| 09:26 | in the ones place tells us that we need to | |
| 09:28 | round our target digit up by one but it's already | |
| 09:31 | a nine . So we need to zero it and | |
| 09:33 | increase the next number place but that's already a nine | |
| 09:36 | . So we need to zero it and increase the | |
| 09:38 | next number of place But that's already and I am | |
| 09:40 | . And so the pattern continues until we end up | |
| 09:43 | with two million as our final round their number . | |
| 09:46 | So sometimes rounding a number is pretty simple and other | |
| 09:50 | times it's a little more involved . The key is | |
| 09:53 | to remember the rule that if the digit to the | |
| 09:55 | right of the target is less than five , we | |
| 09:58 | leave the target digit the same . But if it's | |
| 10:01 | five or more we increase the target digit by one | |
| 10:05 | . Even if that causes a chain reaction with the | |
| 10:07 | bigger number . Places . All right . So now | |
| 10:10 | , you know a lot about rounding numbers . You | |
| 10:12 | know why we round numbers and you've seen the basic | |
| 10:15 | procedure in action , but just watching a video about | |
| 10:18 | rounding isn't enough to get really good at it . | |
| 10:21 | The only way to do that is to practice . | |
| 10:23 | So be sure to try rounding some numbers on your | |
| 10:25 | own . In fact , rounding is such an important | |
| 10:28 | mask , you'll that you should probably practice it a | |
| 10:30 | lot until you've really got it mastered . As always | |
| 10:33 | . Thanks for watching Math Antics and I'll see you | |
| 10:35 | next time . Learn more at Math Antics dot com | |
| 00:0-1 | . |
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