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RE: Math challenge #2 - Find the value of these recurring square roots
A square root has always two answers, one positive and one negative. For example, sqrt(9) can be either 3 or -3; both are correct. However, for this series to be convergent, we must always choose either positive or negative roots. In the former case, we get the first result, and in the latter case, the second result.
from what ive learned,
if the question says x^2 =9, then x can be either 3,-3 of coz
but if the question says x = sqrt(9), then x is unique and should be 3 but not -3
I think sqrt(9) only equal to 3?
x^2 = 9 => x = +- sqrt(3)
sqrt(3) is always sqrt(3), which is a positive number