Can -5 be the square root of 25?

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Can -5 be the square root of 25?

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Answer 1 · 2015-09-15T16:27:51

Yes

Explanation:

$5 \times 5 = 25$ $5 xx 5 =25$
Hence 5 is the square root of 25.

Answer 2 · 2015-09-15T21:09:05

$- 5$ $-5$ is a square root of $25$ $25$ in that ${(- 5)}^{2} = 25$ $(-5)^2 = 25$

When we say the square root of a positive number, we usually mean the positive square root, also known as the principal square root.

Explanation:

Any non-zero number has exactly $2$ $2$ square roots.

Actually in a technical sense $0$ $0$ has $2$ $2$ square roots, but they are both $0$ $0$ .

If $x > 0$ $x > 0$ then $\sqrt{x}$ $sqrt(x)$ denotes the positive square root and $- \sqrt{x}$ $-sqrt(x)$ denotes the negative one.

If $x < 0$ $x < 0$ then $\sqrt{x} = i \sqrt{- x}$ $sqrt(x) = i sqrt(-x)$ denotes the square root with positive coefficient of $i$ $i$ (the imaginary unit). $- \sqrt{x} = - i \sqrt{- x}$ $-sqrt(x) = -i sqrt(-x)$ is the other square root.

If $z$ $z$ is Complex, then it still has exactly two square roots, but different people use different conventions as to which one is the principal square root (i.e. the one represented as $\sqrt{z}$ $sqrt(z)$ ).

In terms of polar representation, this boils down to choosing whether you prefer to use angles in the range $(- π, π]$ $(-pi, pi]$ or $[0, 2 π)$ $[0, 2pi)$ for $z$ $z$ , resulting in angles in the range $(- \frac{π}{2}, \frac{π}{2}]$ $(-pi/2, pi/2]$ or $[0, π)$ $[0, pi)$ for $\sqrt{z}$ $sqrt(z)$ .

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Can -5 be the square root of 25?

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