To solve the equation \( \frac{xx}{3} + 63 = 60 \), we will first express the equation clearly:
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Start by simplifying. Multiply both sides of the equation by 3 to eliminate the fraction: \[ xx + 189 = 180 \]
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Next, move 189 to the right side: \[ xx = 180 - 189 \]
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This gives: \[ xx = -9 \]
Now we need to find \( x \) such that \( x^2 = -9 \). However, this implies that \( x \) has to be complex, as there are no real solutions.
The solutions are: \[ x = 3i \quad \text{or} \quad x = -3i \]
Among the choices given: \( 369, -9, 41, -1 \), none of them represent solutions to the equation. Thus, the answer based on the equation taken literally leads to complex solutions, but if constrained to the real numbers, the root does not match any of the provided options.