Placeholder Image

字幕列表 影片播放

  • In the last section, we learned how to convert some special Base 10 fractions into decimals, and vice versa.

  • Now, were going to learn how to convert ANY fraction into a decimal.

  • And it turns out to be really simpleall you have to do is divide.

  • Since a fraction is really just a division problem, if you go ahead and DO the division,

  • youll get an answer, and that answer will be the decimal value of the fraction.

  • Now there’s two ways we can do the divisionthe easy way, and the hard way.

  • Now just because I’m mean, were going to start with the hard way.

  • Let’s take the fraction one-half and convert it into a regular division problem with this division symbol.

  • Now, all we have to do is follow the procedure for division.

  • We just see how many times this ‘2’ divides into this ‘1’.

  • Uh Oh! It won’t divide any times. ‘2’ is bigger than ‘1’.

  • looks like were going to need some help, and that’s where the decimal point comes in.

  • Now you remember that in the last section, we learned that ‘1’ could be written as 1.0 or 1.00 or 1.000 and its value is still ‘1’.

  • Let’s try doing that here and see what happens.

  • After the ‘1’, put a decimal point and then a zero in the tenths place.

  • Now our division problem looks like 10 divided by 2, and that’s easy to do!

  • The only difference is we have a decimal point.

  • Let’s ignore the decimal point for a minute and pretend that our problem really is 10 divided by 2.

  • So 2 will go into 10 five times because 5 times 2 equals 10, and that leaves no remainder. So were done, right?

  • Not so fast, weve got that decimal point to deal with.

  • And we know that 5 can’t be the answer because 5 is bigger than one-half.

  • We just need to include the decimal point in our answer for it to be correct.

  • We put it directly above the decimal point in our problem.

  • Therenow our answer ispoint 5” (or 0.5 which is the more proper way to write it.)

  • So, by dividing, we figured out that the decimal value of 1/2 is 0.5

  • Now let’s try converting the fraction 3/4 by dividing.

  • Of course we start by rewriting our fraction like this: 3 divided by 4.

  • And again, we run into the same problem: 4 is too big to go into 3,

  • so it looks like were going to need a decimal point here too.

  • Let’s put a decimal point after the 3, and a zero in the tenths place to make 3.0

  • Now our problem almost looks like 30 divided by 4. Now if you remember your multiplication table,

  • youll know that 4 goes into 30 seven times because 7 times 4 is 28.

  • 30 minus 28 leaves a remainder of 2, but we don’t want a remainder, so let’s keep going.

  • 4 is too big to divide into 2, so the only way we can get rid of the remainder

  • is to use another zero in the hundredths place which make the number were dividing up kind of look like 300.

  • Now we can bring down that extra zero to make the remainder look like 20.

  • And 4 will go into 20 five times because 5 times 4 equals 20, and that leaves no remainder. Oh yeah!

  • But don’t forget, we need to include the decimal point in our answer.

  • Now if youve kept your column lined up like I have, youll see that the decimal point goes right here,

  • and that makes our answer: 0.75 So the decimal value of 3/4 is 0.75

  • Alright, let’s convert one more the hard way.

  • Let’s find the decimal value of 1/3 by dividing 1 by 3.

  • Again, 3 is too big to divide into 1, so well need to use

  • a decimal point and another zero which makes our problem look like 10 divided by 3.

  • That’s easy! 3 goes into 10 three times because 3 times 3 equals 9. And that leaves a remainder of 1.

  • Just like before, we don’t want a remainder, so let’s use another zero so we can keep on dividing.

  • And that gives us 10 divided by 3 again.

  • Well, we know that 3 goes into 10 three times, and leave a remainder of 1.

  • Huh?! …still a remainder of 1. Well it looks like were gonna need another zero.

  • But that’s just gonna give us 10 divided by 3 again, which is going to give us another remainder of 1.

  • This looks like it might keep on going forever!

  • Some fractions are like that.

  • If you divide them, youll see a repeating pattern of numbers that continues on forever.

  • So the decimal value of 1/3 is 0.3333333…. and ‘3’s that keep on going forever!

  • But since we can’t keep writing ‘3’s forever, we can just stop and round the number off.

  • Or we can use this special symbol that meansthis number repeats forever”.

  • Alright, so all we have to do to convert a fraction into a decimal is divide.

  • And so far, weve been doing that the hard way. But now, were gonna do it the easy way.

  • Were gonna use a calculator!

  • Let’s try a couple with the calculator and see what we get.

  • To convert one-fourth, we just punch in 1 divided by 4 and we get 0.25

  • To convert two-thirds, we just punch in 2 divided by 3 and we get... “zero point a whole lot of sixes”.

  • looks like we have another one of those repeating decimals.

  • Yep, this way is certainly is easier, and quicker too.

  • But it’s important to know how to do it both ways.

  • The five fractions that weve just converted are so common that it’s a good idea to memorize their decimal values.

  • Here there are again so you can review them:

  • 1/4 = 0.25

  • 1/3 = 0.33333…

  • 1/2 = 0.5

  • 2/3 = 0.66666…

  • and 3/4 = 0.75

  • So that’s how you convert any fraction into a decimal. You just divide!

  • And we already learned how you go the other way (to convert a decimal into a fraction) in the last section,

  • so be sure to review it if you need too.

  • In the next section, were going to learn a few tricks that we can use to help us compare the values of fractions,

  • but before that, …a quick review.

  • To convert ANY fraction to a decimal number, all you have to do is divide the top number by the bottom number.

  • Usually when you divide a fraction, youll need to do decimal division.

  • By using the decimal point, you can keep writing zeros in the decimal number places and continue dividing until you have no remainder.

  • Sometimes decimal division results in a pattern that keeps repeating forever.

  • When that happens, you can draw a line over the repeating digits instead of writing them forever.

  • Once you know how to do decimal division, I recommended that you convert fractions using a calculator since it’s quicker and easier.

  • And as always, be sure to do the exercises.

  • And don’t forget to practice dividing the hard way too,

  • because if youre ever stranded on a deserted island without a calculator, you need to be able to do your math homework! ;-)

  • Learn more at www.mathantics.com

In the last section, we learned how to convert some special Base 10 fractions into decimals, and vice versa.

字幕與單字

單字即點即查 點擊單字可以查詢單字解釋

B1 中級 美國腔

數學反常學--換算任何分數 (Math Antics - Converting Any Fraction)

  • 14 7
    Yassion Liu 發佈於 2021 年 01 月 14 日
影片單字