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  • Hi and welcome to Math Antics.

  • In today’s lesson, were gonna learn all about factoring.

  • Factoring is a math operation. It’s something you DO to a number.

  • Now with the other math operations youve done so far, youre given two or more numbers to work with.

  • But with factoring, you only get one number.

  • That’s because factoring is like being given the answer to a multiplication problem and then having to figure out what that problem was.

  • So you can think of factoring asUN-multiplying’.

  • When you multiply, you take two numbers and multiply them together to get one number.

  • And when you factor, you take one number, and figure out what two numbers you could multiply together to get that number.

  • For example, let’s say youre asked to factor the number 10.

  • Now that means that you need to figure out what numbers you could multiply together to get 10.

  • If you know your multiplication table, youll remember that 2 times 5 equals 10.

  • That means that 2 and 5 are FACTORS of 10.

  • So factors are just the parts of a multiplication problem, and factoring is figuring out what those parts are.

  • I’m sure some of you are wondering, “Why would I ever want to factor a number?”

  • Now that’s a good question, and I have a good answer.

  • Factoring can make solving some math problems easier.

  • For example, factoring is really useful for simplifying fractions.

  • By breaking a number up into its factors, you can sometimes cancel out factors that aren’t really needed.

  • For now though, you just need to learn what factoring is and how to do it.

  • So let’s see another example. Let’s factor the number 24.

  • For this one, I think I’ll use my multiplication table.

  • Let’s see herealright, well 4 times 6 is 24. So that means that 4 and 6 are factors of 24.

  • Now hold on… I’m sure some of you have seen that 3 times 8 is also 24.

  • And that’s true. We could have decided to factor 24 into 3 times 8 instead.

  • So which of the factors is right? Is is 4 and 6 or 3 and 8?

  • Actually, theyre both right. There can be more than one way to factor a number.

  • That’s one of the things that might make factoring a little confusing at first.

  • Youre used to having just one right answer,

  • because when you add, subtract, multiply or divide, there is just one right answer.

  • But when you factor (or un-multiply) a number, you might find that there’s more than one correct way you can do it.

  • So we can see that the number 24 has quite a few factors.

  • 4 is a factor, 6 is a factor, 3 is a factor and 8 is a factor.

  • The fact that each of these numbers is a factor of 24 means that each of them can divide evenly into 24.

  • And when I saydivide evenly”, I mean that it will divide in without a remainder.

  • For example, if we take our first factor (4) and divide it into 24 using a calculator, our answer will be 6.

  • 4 divides into 24 six times with no remainder.

  • But what if we try to divide 24 by a number that ISN’T one of our factors; like the number 7?

  • If we try 24 divided by 7 on a calculator, we get 3.42857… blah, blah, blah … a long decimal number.

  • That didn’t divide in evenly because there’s a big remainder!

  • What we just did is calledtesting for divisibility”.

  • Testing for divisibility is a way to find out if a number is a factor of another number.

  • With the test we just did, we confirmed that 4 is a factor of 24 but 7 is not.

  • Sometimes you may be asked to find ALL the factors of a number.

  • If that happens, you can use testing for divisibility to solve the problem.

  • To see how it works, let’s try to find ALL the factor or 24.

  • We already know four of them, but there’s a lot more numbers we can test.

  • Fortunately, we only need to test numbers that are less than half of the number were testing.

  • And since half of 24 is 12, we just need to test the numbers 1 thru 12.

  • To keep things organized, let’s list the numbers we are gonna test

  • and we'll circle the factors that we already know: 3, 4, 6, and 8.

  • We can also cross out the 7 since we already tested it and found out it wasn’t a factor.

  • Okay, now for the numbers we haven’t tested yet. Let’s start with 1.

  • Well of course 1 is a factor, because 1 will divide evenly into ANY whole number.

  • So 1 is always a factor.

  • And since 1 is a factor, then that means 24 is also a factor because 1 × 24 = 24.

  • It might seem weird that a number is always a factor of itself, but it’s true.

  • Knowing that helps you get started listing the factors,

  • because you can ALWAYS include 1 and the number itself.

  • Now let’s move on and test 2.

  • If we divide 24 by 2, we get 12.

  • So yes, 2 is a factor because it divided evenly.

  • You can factor 24 into 2 × 12.

  • That means that we can ALSO circle 12 as a factor of 24.

  • So, any time you do a divisibility test, and the number you are checking passes the test,

  • then the answer you get from dividing will also pass the testit will ALSO be a factor!

  • That will speed things up because we know we don’t have to test 12.

  • Okay, let’s move on to the next number we haven’t checked: 5

  • 24 divided by 5 equals 4.8

  • Well that didn’t divide evenly because our answer is a decimal number.

  • That means that 5 is NOT a factor of 24.

  • Next well try 9. 24 divided by 9 equals 2.66666…

  • That’s definitely not a factor.

  • Okayhow about 10?

  • 24 divided by 10 equals 2.4

  • Nope, that’s a decimal number, so 10 is not a factor.

  • It looks like the last one we have to try is 11.

  • 24 divided by 11 equals 2.181818… That’s not a factor either.

  • Alright, since weve tested all the numbers that are less than half of 24,

  • weve found ALL of its possible factors, and they are: 1, 2, 3, 4, 6, 8, 12, and 24.

  • Now I know that might seem like a lot of work, but fortunately you probably won’t have to do many of those problems.

  • The important thing is just to know what factoring is, and how you can usetesting for divisibilityto help you find factors.

  • Alright, that wraps up this lesson.

  • But since actually doing math is the best way to learn it, be sure to try the exercise problems for this section.

  • Thanks for watching and I’ll see you next time.

  • Learn more at www.mathantics.com

Hi and welcome to Math Antics.

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