The mean is calculated by dividing the sum of a set of values (the dividend) by the number of values in that set (the divisor). The sign of the quotient, or the mean, will depend on the sign of the dividend because the divisor (the count of values) is always positive. If the sum of the values is positive, the mean will also be positive; if the sum is negative, the mean will be negative. Thus, the sign of the mean directly reflects the sign of the sum of the values.
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.
No.
To perform division with a remainder, divide the dividend (the number being divided) by the divisor (the number you are dividing by) to find the quotient (the whole number result). Multiply the quotient by the divisor, and then subtract this product from the original dividend to find the remainder. The final result can be expressed as: Dividend = (Divisor × Quotient) + Remainder. The remainder must always be less than the divisor.
Quotient 0, remainder 805. Note that you will always get this pattern when you divide a smaller number by a larger one - i.e., the quotient will be zero, and the remainder will be the dividend.
An estimate for the quotient of a division problem involving decimals is sometimes less than the actual quotient. This can occur when rounding the dividend or divisor down, which may lead to a smaller estimated result. However, if rounding leads to higher values, the estimate could be greater than or equal to the actual quotient. Therefore, the relationship between the estimate and the actual quotient depends on the specific numbers and how they are rounded.
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.
Always.
No.
no it does not thank you
To perform division with a remainder, divide the dividend (the number being divided) by the divisor (the number you are dividing by) to find the quotient (the whole number result). Multiply the quotient by the divisor, and then subtract this product from the original dividend to find the remainder. The final result can be expressed as: Dividend = (Divisor × Quotient) + Remainder. The remainder must always be less than the divisor.
Quotient 0, remainder 805. Note that you will always get this pattern when you divide a smaller number by a larger one - i.e., the quotient will be zero, and the remainder will be the dividend.
Unless you are using remainders, no because the divisor may not divide evenly into the dividend you idiots.
The quotient for whole numbers will always be less than or equal to the dividend. It will never be more.
An estimate for the quotient of a division problem involving decimals is sometimes less than the actual quotient. This can occur when rounding the dividend or divisor down, which may lead to a smaller estimated result. However, if rounding leads to higher values, the estimate could be greater than or equal to the actual quotient. Therefore, the relationship between the estimate and the actual quotient depends on the specific numbers and how they are rounded.
yes
True.
Yes, but this is true of not just unit fractions but any positive number.