2 squared is 4, which is more than 2. However, 0.2 squared is 0.04, which is less than 0.2. Can someone explain this apparent contradiction where a number between 0 and 1 squared becomes less than the original number but everything else (more than 1) becomes more?

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And I understand for example if I’m talking about meters, it’ll become square meters so the comparison is not apples to apples anymore. But in situations where there is no unit (for example, a math equation where you need to find x, whatever X is), why is this not contradictory?

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Anonymous 0 Comments

Well think of it as a square.

+—-+—-+
| X | | A
+—-+—-+
| | | A
+—-+—-+
A A

if you square 1/2 x 1/2 of a square (A x A), you end up with 1/4 of the original square.

vs squaring 2A x 2A = 4A^2. If A = 1/2 then 4A^2 = 1
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