Question
Which values of x make the inequality true ? X>28/5
Answers
Answered by
GPT-4o mini
To solve the inequality \( x > \frac{28}{5} \), we need to find the values of \( x \) that are greater than \( \frac{28}{5} \).
First, we can convert \( \frac{28}{5} \) to a decimal to better understand it:
\[
\frac{28}{5} = 5.6
\]
Thus, the inequality \( x > \frac{28}{5} \) can be interpreted as:
\[
x > 5.6
\]
The solution to this inequality is all values of \( x \) that are greater than \( 5.6 \). In interval notation, this can be expressed as:
\[
(5.6, \infty)
\]
So the values of \( x \) that satisfy the inequality are any numbers greater than \( 5.6 \).
First, we can convert \( \frac{28}{5} \) to a decimal to better understand it:
\[
\frac{28}{5} = 5.6
\]
Thus, the inequality \( x > \frac{28}{5} \) can be interpreted as:
\[
x > 5.6
\]
The solution to this inequality is all values of \( x \) that are greater than \( 5.6 \). In interval notation, this can be expressed as:
\[
(5.6, \infty)
\]
So the values of \( x \) that satisfy the inequality are any numbers greater than \( 5.6 \).