How come there are no solutions to the equation, $\sqrt{x} = - 10$ $sqrtx = - 10$ ?

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How come there are no solutions to the equation, $\sqrt{x} = - 10$ $sqrtx = - 10$ ?

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Answer 1 · 2018-08-07T12:27:39

There is no real number that makes a negative number when squared.

Explanation:

Any positive number multiplied by itself (squared) produces a positive answer.

e.g. $2 \cdot 2 = 4$ $2*2 = 4$

Any negative number multiplied by itself (squared) produces a positive answer.

e.g. $- 2 \cdot - 2 = 4$ $-2*-2 = 4$

The square root of a number is the number that multiplies by itself to produce the product.

$\sqrt{x} \cdot \sqrt{x} = x$ $sqrtx * sqrtx = x$

If $x$ $x$ is negative, there is no real number that is its square root.

Answer 2 · 2018-08-07T12:41:04

If you were to square both sides, you would get $x = 100$ $x=100$ .
However, if you were to square root both sides of $x = 100$ $x=100$ , you would get $\sqrt{x} = 10$ $sqrtx=10$ , where $\sqrt{x} \neq - 10$ $sqrtx!=-10$ .

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How come there are no solutions to the equation, $\sqrt{x} = - 10$ $sqrtx = - 10$ ?

2 Answers

Explanation:

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