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### Course: 5th grade (Eureka Math/EngageNY) > Unit 4

Lesson 7: Topic G: Division of fractions and decimal fractions- Relate fraction division to fraction multiplication
- Visually dividing whole numbers by unit fractions
- Dividing whole numbers by unit fractions visually
- Dividing a whole number by a unit fraction
- Dividing whole numbers by unit fractions
- Visually dividing unit fraction by a whole number
- Dividing unit fractions by whole numbers visually
- Dividing a unit fraction by a whole number
- Dividing unit fractions by whole numbers
- Dividing whole numbers by fractions: word problem
- Dividing fractions by whole numbers: studying
- Divide fractions and whole numbers word problems
- Fraction and whole number division in contexts
- Rewriting a fraction as a decimal: 3/5
- Rewriting a fraction as a decimal: 21/60
- Fractions as division by a multiple of 10
- Dividing decimals
- Divide decimals by whole numbers
- Divide decimals like 16.8÷40 by factoring out a 10

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# Visually dividing whole numbers by unit fractions

In this video, you'll learn how to divide whole numbers by fractions. You'll watch examples of dividing wholes into fractional pieces and practice counting those pieces. It's all about understanding how many fractional parts make up a whole.

## Want to join the conversation?

- 3 divided by 1/6 is like 3x6(25 votes)
- Yes, that is right.(5 votes)

- Should I write it to remember it(8 votes)
- Yes do it. If writing it down helps you(8 votes)

- You can just do 3 x 6 = 18 pieces.(11 votes)
- Yes as you apply the rule(1 vote)

- Makes VERY sense thank you(10 votes)
- A Mixed number has a whole number part and a fraction part.

Rather than simply having a fraction with a bigger numerator than a denominator (an 'improper fraction'), we sometimes write out the full number and the left part of a fraction. For example, we say "1 and 3/4 inches", rather than "7/4" of an inch.(6 votes) - ok.. now I get it. I think. I need to study for a test.(4 votes)
- does sall use the keep switch flip method(3 votes)
- When i divide halves, I like to think about it like this: 5 divided by 1 equals 5. Half of 1 is 1/2. 1/2 times 2 is 1. Therefore you multiply 5 times 2 and you get 10. Basically, every time you see a whole number divided by a half, the answer is twice that number.(2 votes)
- what happends if you divided a fraction by a multidight number?(1 vote)

## Video transcript

- [Narrator] If five is
divided into pieces that are each one half of a whole,
how many pieces are there? And this would be the
equivalent of saying, "What is five divided by 1/2?" And they help us out with this visual. So pause this video and see if you can figure out what that is. How many pieces would you
get if you divide five into pieces that are
each one half of a whole? All right, now let's work
through this together. So here on this number line
we go from zero to five, and then notice they've
divided into pieces that are each a half of a whole. This is one piece right over here. So how many of those halves, so this right over here is one half, how many of those halves
does it take to make five? Well, two halves make a whole,
and we have five wholes. So it's going to be five times two, or 10. And we see that right over here. One half, two, three, four,
five, six, seven, eight, nine, 10 halves make five wholes. So this is going to be equal to 10. So five divided into pieces
of one half, or five wholes divided into pieces of one half
would be equal to 10 pieces. Let's do another example. So we have a similar question here. Here we're asked, "If three wholes are divided into pieces that are each 1/6 of a whole,
how many pieces are there?" Once again, pause this
video and think about it. Well, they really help
us out with this visual because we have three wholes. This is one whole, two
whole, and then three wholes, and then we have divided them into pieces that are each 1/6 of a whole. This is a sixth right
over here, this is a sixth right over here, so each
of these are sixths. And so, if we look at this,
we have six sixths in a whole, and so in three wholes we're
gonna have six, 12, 18 pieces. And you could literally
just count these up. But it makes sense. If you take three wholes and
you divide it into sixths, so this is a sixth right over here, each of these wholes are
going to be six sixths, so three wholes are going to be three times six sixths, or 18 sixths. There you go.