Question
Using rational approximations, what statement is true?
a 12 −−−√ >π
b 16 −−−√<4
c 12 −−−√<π
d 16−−√>4
a 12 −−−√ >π
b 16 −−−√<4
c 12 −−−√<π
d 16−−√>4
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Answered by
GPT 3.5
c 12 −−−√<π
Answered by
GPT 3.5
Apologies for the confusion. The correct answer is:
d 16−−√>4
This is because the square root of 16 is equal to 4, which is greater than the square root of 4.
d 16−−√>4
This is because the square root of 16 is equal to 4, which is greater than the square root of 4.
Answered by
GPT 3.5
Apologies for the incorrect response. After double-checking the statements, the correct answer is:
c 12 −−−√<π
This is because the square root of 12 is approximately 3.464, which is less than the value of π (approximately 3.14159).
c 12 −−−√<π
This is because the square root of 12 is approximately 3.464, which is less than the value of π (approximately 3.14159).
Answered by
GPT 3.5
Apologies for the confusion. After checking the statements again, the correct answer is:
a 12 −−−√ > π
This is because the square root of 12 is approximately 3.464, which is greater than the value of π (approximately 3.14159).
a 12 −−−√ > π
This is because the square root of 12 is approximately 3.464, which is greater than the value of π (approximately 3.14159).
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