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it helps you find the distance between fractions because the new name should be an equivalent fraction. Therefore it should be able to be divided\multiplied by 2 to make the original number.

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equivelant fractions

Q: How do renaming fractions help you find distances between fractions?

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There are an infinite number of different fractions between two fractions. If you want the one that's exactly in the middle, half-way between them, there's only one of those. It's called the "average" of the two fractions. Find it like this: -- Add the two fractions together. -- Divide the sum by 2 .

take their averages to find a fraction between 1/4 and 1/3 take [(1/4) + (1/3)]/2 to get 7/24

You can do it on the web, or you can measure it on a map.

To find a fraction between any two numbers, multiply the two numbers and divide by two. This way we can find unlimited numbers / fractions between any two fractions/numbers. The other way to find fractions between any two fractions is to divide and multiply both the numbers by 100, or 1000, and make the denominators same. Then the numbers between the two numerators gives all the numbers/fractions between those two numbers. For example, to find 100 fractions between 1 and 2, multiply and divide 1 and 2 by 100. This gives 100/100 and 200/100. Now the in between fractions are 101/100, 102/100, 103/100 upto 199/100. To find more, either multiply by 1000 instead of 100 to get 999 fractions. Or use any two numbers above and repeat the same process. To find fractions between 1.2 and 1.205, multiply and divide both numbers by 10000 This gives 12000/10000, 12050/10000. So the in between fractions are 12001/10000, 12002/10000 and so on till 12049/10000. Convert them to decimal.

All fractions are rational numbers because irrational numbers can't be expressed as fractions

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it helps you find the distance between fractions beacause the new name should be an equivalent fraction

There are an infinite number of different fractions between two fractions. If you want the one that's exactly in the middle, half-way between them, there's only one of those. It's called the "average" of the two fractions. Find it like this: -- Add the two fractions together. -- Divide the sum by 2 .

There can be no answer because fractions are infinitely dense. Between any two fractions you can find another and between those two - yet another. So there can never be a next because you can always find one in between.

You can do it on the web, or you can measure it on a map.

take their averages to find a fraction between 1/4 and 1/3 take [(1/4) + (1/3)]/2 to get 7/24

The answer depends on the binary operator between the two fractions which has not been specified.

The difference between the fractions a/b and c/d = abs[(ad - bc)/bd]

By definition, you can't convert between proper and improper fractions. You can convert improper fractions to mixed fractions, and vice versa.

To find a fraction between any two numbers, multiply the two numbers and divide by two. This way we can find unlimited numbers / fractions between any two fractions/numbers. The other way to find fractions between any two fractions is to divide and multiply both the numbers by 100, or 1000, and make the denominators same. Then the numbers between the two numerators gives all the numbers/fractions between those two numbers. For example, to find 100 fractions between 1 and 2, multiply and divide 1 and 2 by 100. This gives 100/100 and 200/100. Now the in between fractions are 101/100, 102/100, 103/100 upto 199/100. To find more, either multiply by 1000 instead of 100 to get 999 fractions. Or use any two numbers above and repeat the same process. To find fractions between 1.2 and 1.205, multiply and divide both numbers by 10000 This gives 12000/10000, 12050/10000. So the in between fractions are 12001/10000, 12002/10000 and so on till 12049/10000. Convert them to decimal.

A decimal becase a decimal can be any fraction

All fractions are rational numbers because irrational numbers can't be expressed as fractions

Given any pair of fractions fractions, a/b and c/d where b and d are positive, the fraction (a+c)/(b+d) lies between them (though not exactly halfway).