The answer will depend on the sign of the fraction.
(1/4) / 2 = 1/8, which is smaller.
(-1/4) / 2 = -1/8, which is greater.
The answer depends on the sign of the numbers.(1/4) / 2 = 1/8, which is smaller.(-1/4) / 2 = -1/8, which is greater.
True.
Yes, but this is true of not just unit fractions but any positive number.
I have no idea about the quotation, but the quotient is less than the divisor.
less than
The answer depends on the sign of the numbers.(1/4) / 2 = 1/8, which is smaller.(-1/4) / 2 = -1/8, which is greater.
The quotient is less than the fraction.
True.
To determine if the quotient of two fractions is greater than 1, compare the two fractions directly. If the numerator (the first fraction) is greater than the denominator (the second fraction), the quotient will be greater than 1. Alternatively, you can convert the division of fractions into multiplication by flipping the second fraction and multiplying; if the result is greater than 1, the original quotient is also greater than 1.
Yes, but this is true of not just unit fractions but any positive number.
I have no idea about the quotation, but the quotient is less than the divisor.
less than
To find a division problem with a quotient greater than 200 and less than 250, we can set up an equation: dividend ÷ divisor = quotient. Let's use 50,000 as the dividend and 200 as the divisor. Therefore, 50,000 ÷ 200 = 250, which is greater than 200 and less than 250.
No. The quotient is less than or greater than the dividend, depending on the sign of the fraction.4 / (1/2) = 8, which is greater than 4.4 / (-1/2) = -8, which is smaller than 4.-4 / (1/2) = -8, which is smaller than -4.-4 / (-1/2) = 8, which is greater than -4.
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greater
The quotient is not always bigger than the divisor; it depends on the relationship between the dividend and divisor. When the dividend is smaller than the divisor, the quotient will be less than one. However, when the dividend is larger than the divisor, the quotient can be greater than, equal to, or less than the divisor depending on the specific numbers involved. Thus, the statement is not universally true.