Question
Using rational approximations, what is an inequality statement comparing \pi and √(8)?
Enter \ \textless \, \ \textgreater \, or =.
The inequality is: \pi \ \square \ √(8)
Enter \ \textless \, \ \textgreater \, or =.
The inequality is: \pi \ \square \ √(8)
Answers
GPT-4o mini
To compare \(\pi\) and \(\sqrt{8}\), we can use rational approximations:
1. We know that \(\pi\) is approximately equal to \(3.14\).
2. To calculate \(\sqrt{8}\):
\[
\sqrt{8} = \sqrt{4 \times 2} = \sqrt{4} \cdot \sqrt{2} = 2\sqrt{2}.
\]
The approximate value of \(\sqrt{2}\) is about \(1.414\).
Therefore,
\[
2\sqrt{2} \approx 2 \times 1.414 \approx 2.828.
\]
Now we compare:
- \(\pi \approx 3.14\)
- \(\sqrt{8} \approx 2.828\)
We can see that:
\[
\pi > \sqrt{8}
\]
Thus, the inequality statement is:
\[
\pi \ > \ \sqrt{8}
\]
So, the answer is:
\(\pi \ \square \ \sqrt{8}\) where \(\square\) is \(>\).
1. We know that \(\pi\) is approximately equal to \(3.14\).
2. To calculate \(\sqrt{8}\):
\[
\sqrt{8} = \sqrt{4 \times 2} = \sqrt{4} \cdot \sqrt{2} = 2\sqrt{2}.
\]
The approximate value of \(\sqrt{2}\) is about \(1.414\).
Therefore,
\[
2\sqrt{2} \approx 2 \times 1.414 \approx 2.828.
\]
Now we compare:
- \(\pi \approx 3.14\)
- \(\sqrt{8} \approx 2.828\)
We can see that:
\[
\pi > \sqrt{8}
\]
Thus, the inequality statement is:
\[
\pi \ > \ \sqrt{8}
\]
So, the answer is:
\(\pi \ \square \ \sqrt{8}\) where \(\square\) is \(>\).