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Re: If #x is defined for all x > 2 as the square root of the nu [#permalink]
Given that #x is defined as the square root of the number that is 2 more than x and we need to find the value of #7 - #(-1)

#7 = square root of the number that is 2 more than 7
=> #7 = \(\sqrt{(7 + 2)}\) = \(\sqrt{9}\) = 3
Similarly, #(-1) = \(\sqrt{(-1 + 2)}\) = \(\sqrt{1}\) = 1

=> #7 - #(-1) = 3 - 1 = 2

So, Answer will be 2
Hope it helps!

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Re: If #x is defined for all x > 2 as the square root of the nu [#permalink]
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