Asked by nobody

To solve the inequality \( Rx > 10 \) where \( R \) is a positive number, you can divide both sides of the inequality by \( R \):

\[
\frac{Rx}{R} > \frac{10}{R}
\]

This simplifies to:

\[
x > \frac{10}{R}
\]

So in the context of filling in the blanks:

\( x > \frac{10}{R} \).

This shows the relationship between \( x \) and \( R \). Thus, the inequality solution can be stated as:

\( x \) is greater than \( \frac{10}{R} \) over \( R \).

I apologize for any confusion. Let's clarify the inequality \( Rx > 10 \) and determine the relationship between \( x \) and \( R \).

Given:
\[
Rx > 10
\]

Since \( R \) is greater than 0, we can divide both sides by \( R \) without changing the direction of the inequality:

\[
x > \frac{10}{R}
\]

To express \( x \) relative to \( R \):

1. Rearranging the inequality yields \( x \) on one side.
2. Thus, we see that \( x \) must be greater than \( \frac{10}{R} \).

Inserting this into the initial format you requested:

The answer can be expressed as:

**\( x > \frac{10}{R} \)**.

If you want the answer in a fill-in-the-blank format, it can be written as:

\( x > \frac{10}{R} \) over \( R > 0 \).

If there are specific details or formats you’d like to follow, please clarify!