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Equivalent fractions and comparing fractions: FAQ

Frequently asked questions about equivalent fractions and comparing fractions.

What are equivalent fractions?

Equivalent fractions are fractions that look different but represent the same amount. For example, 12, 24, and 36 are all equivalent fractions.

How can we find equivalent fractions?

We can use fraction models or number lines to find equivalent fractions.
For example, 68 is at the same location on the number line as 34.
3 pieces of 14 has the same area as 6 pieces of 18 .

How can we compare fractions with the same numerator?

When comparing fractions with the same numerator, the fraction with the smaller denominator will be larger. For example, if we compare 12 and 14, we can see that 12 is larger because the denominator is smaller (so the single "part" is larger).

How can we compare fractions with the same denominator?

When comparing fractions with the same denominator, the fraction with the larger numerator will be larger. For example, if we compare 24 and 34, we can see that 34 is larger because the numerator is larger (so there are more "parts" in the fraction).

Where do we use comparing fractions and equivalent fractions in the real world?

There are many potential real-world applications for comparing and working with equivalent fractions. For example, in cooking, we might need to use equivalent fractions in order to follow a recipe accurately if we don't have the right measuring cup on hand. We might also need to compare fractional measurements when sewing or doing carpentry work in order to cut a piece of material to the right size.

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