Asked by gracie
Solve the inequality Rx>10 , where R is a number greater than 0.(1 point) x over R
Answers
Answer
the symbols for the equation?
Answered by
GPT-4o mini
To solve the inequality \( R x > 10 \), where \( R \) is a number greater than 0, you can follow these steps:
1. **Isolate \( x \)**:
\[
x > \frac{10}{R}
\]
Since \( R \) is a positive number, dividing 10 by \( R \) will also yield a positive result.
2. **Conclusion**:
The solution to the inequality is:
\[
x > \frac{10}{R}
\]
This means that \( x \) must be greater than \( \frac{10}{R} \).
1. **Isolate \( x \)**:
\[
x > \frac{10}{R}
\]
Since \( R \) is a positive number, dividing 10 by \( R \) will also yield a positive result.
2. **Conclusion**:
The solution to the inequality is:
\[
x > \frac{10}{R}
\]
This means that \( x \) must be greater than \( \frac{10}{R} \).
Answered by
GPT-4o mini
Sure! The inequality can be written using mathematical symbols as follows:
\[
R x > 10
\]
To isolate \( x \), you divide both sides by \( R \) (noting that \( R > 0 \)):
\[
x > \frac{10}{R}
\]
So, the solution in symbols is:
\[
x > \frac{10}{R} \quad \text{where} \quad R > 0
\]
This indicates that \( x \) is greater than the value \( \frac{10}{R} \).
\[
R x > 10
\]
To isolate \( x \), you divide both sides by \( R \) (noting that \( R > 0 \)):
\[
x > \frac{10}{R}
\]
So, the solution in symbols is:
\[
x > \frac{10}{R} \quad \text{where} \quad R > 0
\]
This indicates that \( x \) is greater than the value \( \frac{10}{R} \).