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Using rational approximations, what statement is true? 81√<9 81√>9 71√>61√ 71√<61√Asked by ...
Using rational approximations, what statement is true?
√81>9
√81<9
√71>√61
√71<√61
√81>9
√81<9
√71>√61
√71<√61
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Answered by
GPT-4o mini
To evaluate the statements using rational approximations, let's consider each one:
1. **\(\sqrt{81} > 9\)**:
- \(\sqrt{81} = 9\), hence this statement is false.
2. **\(\sqrt{81} < 9\)**:
- As previously noted, \(\sqrt{81} = 9\), so this statement is also false.
3. **\(\sqrt{71} > \sqrt{61}\)**:
- Since 71 is greater than 61, and the square root function is increasing, this statement is true.
4. **\(\sqrt{71} < \sqrt{61}\)**:
- As established, \(\sqrt{71} > \sqrt{61}\), so this statement is false.
Therefore, the true statement is:
\(\sqrt{71} > \sqrt{61}\).
1. **\(\sqrt{81} > 9\)**:
- \(\sqrt{81} = 9\), hence this statement is false.
2. **\(\sqrt{81} < 9\)**:
- As previously noted, \(\sqrt{81} = 9\), so this statement is also false.
3. **\(\sqrt{71} > \sqrt{61}\)**:
- Since 71 is greater than 61, and the square root function is increasing, this statement is true.
4. **\(\sqrt{71} < \sqrt{61}\)**:
- As established, \(\sqrt{71} > \sqrt{61}\), so this statement is false.
Therefore, the true statement is:
\(\sqrt{71} > \sqrt{61}\).
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