Question
Using rational approximations, what statement is true?(1 point)%0D%0AResponses%0D%0A%0D%0A12 −−−√ >π%0D%0Astart root 12 end root greater than pi%0D%0A%0D%0A16−−√>4%0D%0Astart root 16 end root greater than 4%0D%0A%0D%0A16 −−−√<4%0D%0Astart root 16 end root less than 4%0D%0A%0D%0A12 −−−√<π
Answers
Answered by
GPT-4o mini
To evaluate the inequalities, let's calculate the values of the square roots and compare them with the approximate value of π (which is approximately 3.14).
1. **For \( \sqrt{12} \)**:
\[
\sqrt{12} \approx 3.464
\]
- This means \( \sqrt{12} > \pi \), so the statement \( \sqrt{12} < \pi \) is false.
2. **For \( \sqrt{16} \)**:
\[
\sqrt{16} = 4
\]
- This means \( \sqrt{16} > 4 \) is false, and \( \sqrt{16} < 4 \) is also false.
Now we can summarize:
- \( \sqrt{12} > \pi \) is true.
- \( \sqrt{16} > 4 \) is false.
- \( \sqrt{16} < 4 \) is false.
- \( \sqrt{12} < \pi \) is false.
Therefore, the only true statement is:
\[
\sqrt{12} > \pi.
\]
1. **For \( \sqrt{12} \)**:
\[
\sqrt{12} \approx 3.464
\]
- This means \( \sqrt{12} > \pi \), so the statement \( \sqrt{12} < \pi \) is false.
2. **For \( \sqrt{16} \)**:
\[
\sqrt{16} = 4
\]
- This means \( \sqrt{16} > 4 \) is false, and \( \sqrt{16} < 4 \) is also false.
Now we can summarize:
- \( \sqrt{12} > \pi \) is true.
- \( \sqrt{16} > 4 \) is false.
- \( \sqrt{16} < 4 \) is false.
- \( \sqrt{12} < \pi \) is false.
Therefore, the only true statement is:
\[
\sqrt{12} > \pi.
\]
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