To simplify the expression \(\frac{x^{-3} y}{6 s^{-9}}\) by writing it with positive exponents, we can follow these steps:
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Move the negative exponent terms from the numerator or the denominator:
- The term \(x^{-3}\) can be moved from the numerator to the denominator, making it \(x^{3}\).
- The term \(s^{-9}\) in the denominator can be moved to the numerator, becoming \(s^{9}\).
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Rewrite the expression: \[ \frac{x^{-3}y}{6s^{-9}} = \frac{y s^{9}}{6 x^{3}} \]
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Final expression with positive exponents: \[ \frac{y s^{9}}{6 x^{3}} \]
Thus, the simplified expression with positive exponents is: \[ \frac{y s^{9}}{6 x^{3}} \]