To solve the inequality \( Rx > 10 \) where \( R \) is a positive number, you can follow these steps:
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Divide both sides by \( R \): Since \( R > 0 \), the direction of the inequality remains the same.
\[ x > \frac{10}{R} \]
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Interpret the solution: The solution indicates that \( x \) must be greater than \( \frac{10}{R} \). The exact threshold for \( x \) will depend on the specific value of \( R \).
In terms of the solution set, you can express it as:
\[ x \in \left( \frac{10}{R}, \infty \right) \]
Thus, for any \( R > 0 \), any value of \( x \) that is greater than \( \frac{10}{R} \) satisfies the inequality.
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