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数学英语 40 How to Divide Fractions

时间:2010-11-19 05:48来源:互联网 提供网友:fi1171   字体: [ ]
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by Jason Marshall

A few months ago we talked about how to multiply fractions. Now that we’re comfortable doing this and we’ve talked about a few applications of multiplying fractions such as how to convert units and how to estimate how fast someone is running, the next logical thing to do is learn how to divide fractions too. So, that’s exactly what we’re going to talk about today.
How to Divide One Integer by Another
But before we get to fractions, let’s start by talking about how to divide one integer by another. Now, you might be wondering: Isn’t that just normal division? It’s true, it is. But my goal isn’t for us to talk about the mechanics of doing normal division, but rather to review what it really means. So then what does a problem like 6 divided by 2 really mean? Well, it’s just another way to ask the question: “How many times does 2 go into 6?” And, of course, the answer is 3. You can think of it this way: Imagine you have 6 apples which you then divide up into groups of 2 apples. That means you have 3 groups of 2 apples in front of you—so 6 divided by 2 (or 6 divided into groups of 2) equals 3. Yes, I know this is an extremely simple example, but having a simple example in mind will help as we move to tougher topics.
Okay, before moving on, I want to remind you about something we talked about in the article on how fractions and division are related that’s going to be really important for understanding today’s topic. What is it? It’s the idea that dividing a number by 2 is the same as multiplying it by the fraction 1/2. So, the division problem 6 divided by 2, is equivalent to the multiplication1 problem 6 times 1/2. That means, rather interestingly, that a problem of dividing integers can be turned into a problem of multiplying fractions. And that’s going to come in very handy in a few minutes.
How to Divide a Fraction by an Integer
Now, let’s step up the complexity2 ladder one rung. Instead of dividing an integer by another integer, let’s divide a fraction by an integer. Take the problem 1/2 divided by 3, for example. What does that really mean? Well, it’s asking: “How many times does 3 fit into 1/2?” Right off the bat we know that the answer has to be a number smaller than 1, since 3 doesn’t fit into 1/2 any whole number of times. But it will fit into 1/2 some fractional number of times. What fraction? Well, let’s go back to using the relationship between fractions and division which tells us that the problem 1/2 divided by 3 is equivalent to the problem 1/2 times 1/3—which equals 1/6. And that means that we’ve once again turned a division problem back into a problem of multiplying fractions.
How to Divide an Integer by a Fraction
Okay, let’s turn the problem of dividing a fraction by an integer on its head and instead talk about dividing an integer by a fraction. How about the problem 2 divided by 1/4? What does it really mean? Well, this is where things start to get a bit tougher. The problem 2 divided by 1/4 is asking how many times 1/4 will go into 2. You can think of it this way: Imagine you have two oranges which you divide up into quarters. The question is then: How many of those quarter wedges will fit into 2 oranges? Of course, the answer must be 8 because each orange has 4 quarters, and there are 2 oranges—so 4 times 2 equals 8.
That wasn’t too bad, right? But it’s not always so easy. Here’s what I mean: What if the problem wasn’t 2 divided by 1/4, but was something harder like 7 divided by 8/9 instead. Then you’d be left trying to figure out how many times 8/9 goes into 7—and that’s definitely tougher to do in your head! There’s got to be a better way. And there is. So, what’s the trick?
Divide Fractions Using Invert3 and Multiply
The quick and dirty tip to make dividing fractions easier is to remember to invert and multiply. Here’s what it means. Let’s go back to our problem 2 divided by 1/4, and let’s think of this as a big fraction with 2 in the numerator and the fraction 1/4 in the denominator. The invert part of “invert and multiply” means to take the denominator of this big fraction, 1/4, and invert it. In other words, flip4 it on its head so its numerator becomes its denominator and vice5 versa. The inverse6 of 1/4 is therefore 4/1, or just 4. Now for the multiply part of “invert and multiply”: all you need to do is multiply the 2 from the initial problem by the inverted7 denominator, 4. So, that’s 2 times 4, which of course equals 8—just like we calculated earlier. But, unlike how we calculated this earlier, we now have an easy method for doing harder problems too. Take 7 divided by 8/9. All we have to do is invert 8/9 to get 9/8, and then multiply this by 7 (numerator: 7 x 9 = 63; denominator: 1 x 8 = 8) to find that the answer is 63/8, or 7 and 7/8.
Why Does Invert and Multiply Work
But why does “invert and multiply” work? Well, it works for the exact same reason that we were able to turn the problem of dividing two integers into a problem of multiplying fractions way back at the beginning of this article. In other words, when we turned 6 divided by 2 into the problem 6 times 1/2, we were just inverting8 and multiplying. And each of the reasons we talked about why it worked then are still valid9 for these other types of problems—be it dividing an integer by a fraction or even dividing a fraction by a fraction. Just remember to invert and multiply and your life with fractions will be much easier. Of course, don’t forget why it works too—it’s always a good idea to understand how and why your tools do what they do before you go around trying to use them…that way you don’t try to use something like a sledgehammer for hanging a picture.
Wrap Up
Okay, that’s all the math we have time for today. Please email your math questions and comments to................You can get updates about the Math Dude podcast, the “Video Extra!” episodes on YouTube, and all my other musings about math, science, and life in general by following me on Twitter. And don’t forget to join our great community of social networking math fans by becoming a fan of the Math Dude on Facebook.
Until next time, this is Jason Marshall with The Math Dude’s Quick and Dirty Tips to Make Math Easier. Thanks for reading, math fans!


点击收听单词发音收听单词发音  

1 multiplication i15yH     
n.增加,增多,倍增;增殖,繁殖;乘法
参考例句:
  • Our teacher used to drum our multiplication tables into us.我们老师过去老是让我们反覆背诵乘法表。
  • The multiplication of numbers has made our club building too small.会员的增加使得我们的俱乐部拥挤不堪。
2 complexity KO9z3     
n.复杂(性),复杂的事物
参考例句:
  • Only now did he understand the full complexity of the problem.直到现在他才明白这一问题的全部复杂性。
  • The complexity of the road map puzzled me.错综复杂的公路图把我搞糊涂了。
3 invert HRuzr     
vt.使反转,使颠倒,使转化
参考例句:
  • She catch the insect by invert her cup over it.她把杯子倒扣在昆虫上,将它逮住了。
  • Invert the cake onto a cooling rack.把蛋糕倒扣在冷却架上。
4 flip Vjwx6     
vt.快速翻动;轻抛;轻拍;n.轻抛;adj.轻浮的
参考例句:
  • I had a quick flip through the book and it looked very interesting.我很快翻阅了一下那本书,看来似乎很有趣。
  • Let's flip a coin to see who pays the bill.咱们来抛硬币决定谁付钱。
5 vice NU0zQ     
n.坏事;恶习;[pl.]台钳,老虎钳;adj.副的
参考例句:
  • He guarded himself against vice.他避免染上坏习惯。
  • They are sunk in the depth of vice.他们堕入了罪恶的深渊。
6 inverse GR6zs     
adj.相反的,倒转的,反转的;n.相反之物;v.倒转
参考例句:
  • Evil is the inverse of good.恶是善的反面。
  • When the direct approach failed he tried the inverse.当直接方法失败时,他尝试相反的做法。
7 inverted 184401f335d6b8661e04dfea47b9dcd5     
adj.反向的,倒转的v.使倒置,使反转( invert的过去式和过去分词 )
参考例句:
  • Only direct speech should go inside inverted commas. 只有直接引语应放在引号内。
  • Inverted flight is an acrobatic manoeuvre of the plane. 倒飞是飞机的一种特技动作。 来自《简明英汉词典》
8 inverting 665238808c06737d76fe243704855a65     
v.使倒置,使反转( invert的现在分词 )
参考例句:
  • She caught the insect by inverting her cup over it. 她用杯子扣住了那只昆虫。 来自《简明英汉词典》
  • He started out inverting 2,000,000, but eventually invested only 200,000. 他们开始打算投资200万,可是后来只有20万。 来自互联网
9 valid eiCwm     
adj.有确实根据的;有效的;正当的,合法的
参考例句:
  • His claim to own the house is valid.他主张对此屋的所有权有效。
  • Do you have valid reasons for your absence?你的缺席有正当理由吗?
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