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When the divisor is less than the dividend is greater than one is the quotient is greater than one?
Yes, when the divisor is less than the dividend, and the dividend is greater than one, the quotient will always be greater than one. This is because dividing a larger number by a smaller number yields a result greater than one. For example, if you divide 5 (dividend) by 2 (divisor), the quotient is 2.5, which is greater than one.
What else can I help you with?
Will the quotient be greater than or less than the dividend?
The quotient will be less than the dividend if the divisor is greater than 1. If the divisor is 1, the quotient will equal the dividend. If the divisor is between 0 and 1, the quotient will be greater than the dividend.
When dividing why is the quotient is always bigger than the divisor?
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.
What is a division problem that has a quotient greater than 200 and less than 250?
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.
How do you do division with remainder?
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.
Is an estimate for the quotient of a division problem alwayssometimesor never less than the actual quotient of the numbers explain?
An estimate for the quotient of a division problem is sometimes less than the actual quotient. This occurs when the divisor is rounded down or when the dividend is rounded down, which can lead to a smaller estimate. Conversely, if the divisor is rounded up or the dividend is rounded up, the estimate could be greater than the actual quotient. Thus, the relationship between the estimate and the actual quotient depends on how the numbers are rounded.
Will the quotient be greater than or less than the dividend?
The quotient will be less than the dividend if the divisor is greater than 1. If the divisor is 1, the quotient will equal the dividend. If the divisor is between 0 and 1, the quotient will be greater than the dividend.
When dividing why is the quotient is always bigger than the divisor?
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.
What is a division problem that has a quotient greater than 200 and less than 250?
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.
When you divide a fraction less than one by a whole number greater than one is the quotation less than greater than or equal to the dividend?
I have no idea about the quotation, but the quotient is less than the divisor.
How do you do division with remainder?
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.
Is an estimate for the quotient of a division problem alwayssometimesor never less than the actual quotient of the numbers explain?
An estimate for the quotient of a division problem is sometimes less than the actual quotient. This occurs when the divisor is rounded down or when the dividend is rounded down, which can lead to a smaller estimate. Conversely, if the divisor is rounded up or the dividend is rounded up, the estimate could be greater than the actual quotient. Thus, the relationship between the estimate and the actual quotient depends on how the numbers are rounded.
If you divide by 100 is the quotient greater than or less than than the dividend?
less than
How do you divide by subtraction?
Dividing by subtraction involves repeatedly subtracting the divisor from the dividend until what remains is less than the divisor. The number of times you can subtract the divisor from the dividend before reaching this point is the quotient. For example, to divide 10 by 2, you would subtract 2 from 10 repeatedly (10, 8, 6, 4, 2) until you reach a number less than 2, which gives you a quotient of 5. This method essentially counts how many times the divisor fits into the dividend.
What is a division problem where the quotient is larger than the dividend?
Well, honey, a division problem where the quotient is larger than the dividend is technically not possible in the realm of real numbers. You see, division is all about breaking things down into smaller parts, so it's like trying to fit a big ol' watermelon into a tiny little cup - just ain't gonna happen. Stick to addition if you want to see numbers grow, sweetie.
What is the correct order for the traditional division algorithm?
The traditional division algorithm follows these steps: first, identify the dividend and divisor. Next, divide the leading term of the dividend by the leading term of the divisor to find the first term of the quotient. Multiply the entire divisor by this term and subtract the result from the dividend. Repeat this process with the new polynomial until the degree of the remainder is less than that of the divisor.
Why must the remainder be less than the divisor?
The remainder is less than the divisor because if the remainder was greater than the divisor, you have the wrong quotient. In other words, you should increase your quotient until your remainder is less than your divisor!
Will the quotient be greater than or less than th dividend when you divide 0.34 by 10 explain?
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