If I cut something into 3 equal pieces, there are 3 defined pieces. But, 1÷3= .333333~. Why is the math a nonstop repeating decimal when existence allows 3 pieces? Is the assumption that it’s physically impossible to cut something into 3 perfectly even pieces?

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If I cut something into 3 equal pieces, there are 3 defined pieces. But, 1÷3= .333333~. Why is the math a nonstop repeating decimal when existence allows 3 pieces? Is the assumption that it’s physically impossible to cut something into 3 perfectly even pieces?

In: Mathematics

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Anonymous 0 Comments

Dividing the number ‘1’ into thirds isn’t the same as dividing a cake into thirds. Simply put, numbers aren’t cakes and cakes aren’t numbers. The number ‘1’ has the repeating decimal, a cake does not. Different things divide different ways.
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