When solving the division problem of 120 divided by 10, we can use a simple method to find the quotient or the answer. In this case, we want to determine how many times 10 can go into 120.
To solve this problem, we start by dividing the hundreds digit, which is 1, by the divisor 10. The result of dividing 1 by 10 is 0, since 10 cannot go into 1 without having any remainder.
Next, we move on to the tens digit, which is 2. We divide 2 by 10, and again, the result is 0 since 10 cannot evenly divide into 2.
Finally, we divide the ones digit, which is 0, by 10. The result of dividing 0 by 10 is also 0, as 10 cannot go into 0 without any remainder.
Therefore, when we combine the results of each digit, we find that the quotient of 120 divided by 10 is 12. This means that 10 can go into 120 twelve times without leaving any remainder.
Dividing 10 by 100 is a fairly simple mathematical operation. To divide a number, we need to find out how many times the divisor can be subtracted from the dividend.
When we divide 10 by 100, we start by placing the dividend (10) inside the long division bracket and the divisor (100) outside the bracket. We then divide 10 by 100 and find out how many times 100 can be subtracted from 10.
In this case, 100 cannot be subtracted from 10 even once. This means that when we divide 10 by 100, the quotient will be 0. However, we also need to consider the remainder, which is the amount left after the division.
Since there is no remainder in this case, the division of 10 by 100 can be expressed as 10 ÷ 100 = 0, without any remainder.
So, if you want to divide 10 by 100, the result will be 0, indicating that 10 is a much smaller quantity compared to 100.
When talking about what divides to 120, we are referring to finding the numbers that are factors of 120. Factors are the numbers that divide evenly into a given number without leaving a remainder. In this case, we are looking for all the numbers that are divisible by 120.
120 can be divided by several numbers, including 1, 2, 3, 4, 5, 6, 8, 10, 12, 15, 20, 24, 30, 40, 60, and 120. These numbers are the factors of 120 because they divide 120 without any remainder.
Knowing the factors of 120 can be helpful in various situations. For example, if you are working on a math problem that involves 120, knowing its factors can make solving it easier. Additionally, finding the factors of a number is useful in finding the common factors of multiple numbers.
By finding the factors of 120, you can also determine if a number is divisible by 120. If a number can be divided evenly by 120, it is a multiple of 120. For example, if you have the number 240, you can check if it is divisible by 120 by seeing if it has any factors in common with 120.
In conclusion, 120 can be divided by various numbers which are its factors. These factors are useful in solving math problems and determining the divisibility of other numbers.
How do you solve 120 divided by 6?
To solve this problem, we need to divide 120 by 6. The division sign is represented by the symbol ÷. So, we can write the problem as 120 ÷ 6. When we divide 120 by 6, we are essentially looking for the number of times 6 goes into 120 evenly.
One way to solve this division problem is by long division. In long division, we divide the dividend (120) by the divisor (6) and find the quotient (the answer) and the remainder (if any).
First, we divide 12 (the first digit of 120) by 6. 6 goes into 12 two times, so we write the digit 2 above the division symbol. Then, we multiply 2 by 6, which equals 12. We subtract 12 from 12, leaving us with a remainder of 0.
Next, we bring down the second digit of 120, which is 0. We now have 0 as the new dividend. We divide 0 by 6, and since 6 goes into 0 zero times, we write a 0 above the division symbol. Our quotient is now 20, and we have no remainder.
Finally, we have our answer. 120 divided by 6 equals 20. We can also write it as a division equation: 120 ÷ 6 = 20.
In mathematics, dividing is the process of splitting a number into equal parts. To divide 120 by 3, you can use either long division or mental math.
Long division is a method that involves writing the dividend (in this case, 120) and the divisor (3) in a division format, and then performing a series of steps to find the quotient.
Step 1: Start with the first digit of the dividend, which is 1. Since 1 is less than 3, we bring down the next digit, which is 2.
Step 2: We now have 12 as the new number. We can divide 12 by 3, which equals 4. Write the quotient, 4, on top of the division line above the digit 2, and multiply the quotient by the divisor (4 x 3 = 12).
Step 3: Subtract the product obtained in Step 2 (12) from the 12 we divided and bring down the next digit, which is 0. We now have 0 as the new number.
Step 4: Since 0 is less than 3, we bring down the 0 from the dividend. We now have 0 as the new number.
Step 5: We can divide 0 by 3, which equals 0. Write the quotient, 0, on top of the division line above the digit 0, and multiply the quotient by the divisor (0 x 3 = 0).
Mental math is another approach to divide 120 by 3 without using long division. In this method, we can simply divide each digit of the dividend by the divisor and combine the obtained quotients.
For example, we can divide 1 by 3, which equals 0.33 (approximately), then divide 2 by 3, which equals 0.67 (approximately). Finally, combine both results to get the approximate quotient of 0.3367.
Therefore, when dividing 120 by 3, the quotient is 40 using long division and approximately 0.3367 using mental math.