Difference between revisions of "Square roots are always nonnegative"

Latest revision as of 14:51, 16 May 2025

Many people get confused, thinking that $x^2 = 16$ and $x= \sqrt{16}$ are the same. Though both of these are similar, one of them only has one answer. If we take $x^2 = 16$ , we can see that it has $2$ answers; $4$ and $-4$ . On the other hand, $x = \sqrt{16}$ only has one.

Square Root is a function, and a function cannot have two different answers for one input. Technically $-4$ and $4$ are "square roots" of $16$ , but the square root function only represents one of them--the nonnegative answer.

Revision as of 22:15, 4 February 2025 (view source) Charking (talk \| contribs) m (Proposed for deletion) ← Older edit		Latest revision as of 14:51, 16 May 2025 (view source) Jlacosta (talk \| contribs)
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	'''Square Root''' is a function, and a function cannot have two different answers for one input. Technically <math>-4</math> and <math>4</math> are "square roots" of <math>16</math>, but the square root function only represents one of them--the ''nonnegative'' answer.		'''Square Root''' is a function, and a function cannot have two different answers for one input. Technically <math>-4</math> and <math>4</math> are "square roots" of <math>16</math>, but the square root function only represents one of them--the ''nonnegative'' answer.
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−	~~{{delete\|Long title, can be stated in page [[Square root]]}}~~

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Difference between revisions of "Square roots are always nonnegative"

Latest revision as of 14:51, 16 May 2025