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Identify which condition is necessary for a number to be rationalQuestion
Identify which condition is necessary for a number to be rational.
Answers
Answer
Estimate the value of 6×2–√. Which of the following choices is the best estimate?
Answer
Which statement is true about the square root of 28?
Answer
Which statement is true about the integer fraction that equals the square root of 2?
Answer
Which of the following is irrational?(1 point)
Responses
3√4
Start Fraction Start Root 3 End Root over 4 End Fraction
−7837
negative 7 Start Fraction 8 over 37 End Fraction
3.6363636363636363...
3.6363636363636363...
52.781654292
Responses
3√4
Start Fraction Start Root 3 End Root over 4 End Fraction
−7837
negative 7 Start Fraction 8 over 37 End Fraction
3.6363636363636363...
3.6363636363636363...
52.781654292
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cQUESTIONSc
1. Identify which condition is necessary for a number to be rational.(1 point)
a. It must not be an endless decimal.
b. It must be written as a fraction.
c. It must be able to be expressed as an integer divided by a nonzero integer.
d. It must not be negative.
a. It must not be an endless decimal.
b. It must be written as a fraction.
c. It must be able to be expressed as an integer divided by a nonzero integer.
d. It must not be negative.
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cQUESTIONSc
bot?
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cQUESTIONSc
@botGPT 3.5
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cQUESTIONSc
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Nope
Bot identify which condition is necessary for a number to be rational.
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GPT 3.5
A number is rational if it can be expressed as a fraction (ratio) of two integers, where the denominator is not zero.
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GPT 3.5
To estimate the value of 6×2–√, we can simplify it step by step.
First, let's calculate 2–√. This means taking the square root of 2. The square root of 2 is approximately 1.414.
Now, we can substitute 2–√ = 1.414 into the expression:
6×1.414 ≈ 8.484
Therefore, the best estimate for 6×2–√ is 8.484.
First, let's calculate 2–√. This means taking the square root of 2. The square root of 2 is approximately 1.414.
Now, we can substitute 2–√ = 1.414 into the expression:
6×1.414 ≈ 8.484
Therefore, the best estimate for 6×2–√ is 8.484.
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GPT 3.5
The statement that is true about the square root of 28 is:
The square root of 28 is an irrational number.
This is because 28 is not a perfect square, and the square root of a non-perfect square is an irrational number.
The square root of 28 is an irrational number.
This is because 28 is not a perfect square, and the square root of a non-perfect square is an irrational number.
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GPT 3.5
The statement that is true about the integer fraction that equals the square root of 2 is:
There is no integer fraction that equals the square root of 2.
This is because the square root of 2 is an irrational number, meaning it cannot be expressed as a fraction of two integers. No matter how many integers we try to divide, we cannot find a fraction that equals the square root of 2 exactly.
There is no integer fraction that equals the square root of 2.
This is because the square root of 2 is an irrational number, meaning it cannot be expressed as a fraction of two integers. No matter how many integers we try to divide, we cannot find a fraction that equals the square root of 2 exactly.