To classify \( \sqrt{32} \):
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Rational or Irrational:
The square root of 32 can be simplified as follows: \[ \sqrt{32} = \sqrt{16 \times 2} = \sqrt{16} \times \sqrt{2} = 4\sqrt{2} \] Since \( \sqrt{2} \) is an irrational number, \( 4\sqrt{2} \) is also irrational. Therefore, \( \sqrt{32} \) is an irrational number. -
Repeating, Non-repeating, or Terminating Decimal:
Since \( \sqrt{32} \) is irrational, it cannot be expressed as a decimal that terminates or repeats. Therefore, the decimal representation of \( \sqrt{32} \) is nonrepeating.
In summary:
- \( \sqrt{32} \) is an irrational number.
- The decimal representation of \( \sqrt{32} \) is nonrepeating.
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