When solving the multiplication problem 1 2 x 6, we can use the basic multiplication algorithm to find the answer.
The multiplication algorithm involves the process of multiplying each digit of one number by each digit of the other number, and then adding the products together.
In this case, we have 1 2 as one of the numbers and 6 as the other. To multiply these two numbers, we start with multiplying the ones place digits: 2 multiplied by 6 equals 1 2. We write down the result as the first part of our final answer.
Next, we move on to the tens place digit of the first number, which is 1. We multiply it by 6, which equals 6. We place this result under the first digit of our final answer.
Finally, we add the two partial products together. Adding 1 2 to 6 equals 1 8.
Therefore, the solution to the multiplication problem 1 2 x 6 is 1 8.
By following the multiplication algorithm, we were able to determine that the product of 1 2 and 6 is 1 8.
It is important to remember that this method can be applied to any multiplication problem, regardless of the numbers involved.
When it comes to working out 1 2 divided by 6, the first step is to recognize that 1 2 represents the number 12. So, we can rephrase the problem as "How do you work out 12 divided by 6?"
To solve this division problem, we divide the number 12 by the number 6. By performing this division, we determine how many times 6 can be evenly divided into 12.
In this case, we find that 6 can be divided into 12 exactly 2 times. Therefore, the answer to 1 2 divided by 6 is 2.
How to multiply 1 2 x 6?
To multiply 12 by 6, you can follow these simple steps:
Step 1: Write down the numbers 12 and 6.
Step 2: Align the numbers vertically, with the 6 underneath the 12.
Step 3: Multiply the digit in the ones place of the bottom number (6) by the top number (12). In this case, 6 multiplied by 2 equals 12.
Step 4: Write down the result (12) underneath the line, directly to the right of the digit in the ones place of the bottom number.
Step 5: Multiply the digit in the tens place of the bottom number by the top number. In this case, 6 multiplied by 1 equals 6.
Step 6: Write down the result (6) underneath the line, directly to the left of the result from step 4.
Step 7: Add the two results from steps 4 and 6 together. In this case, 12 + 6 equals 18.
Step 8: Write down the final result (18) below the line.
Therefore, when you multiply 12 by 6, the answer is 18.
Half of a number means dividing that number by two. So if we have a number 'x', then half of it would be x/2.
To find out what half of a number multiplied by 6 is, we need to multiply 'x/2' by 6. Mathematically, it can be written as (x/2) * 6.
Let's take an example to understand it better. Suppose the number 'x' is 10. Half of 10 would be 10/2 = 5. Now if we multiply 5 by 6, we get (5 * 6) = 30. So, in this example, half of 10 multiplied by 6 is 30.
This concept can be applied to any number. Let's take another example. If the number 'x' is 20, half of 20 would be 20/2 = 10. Now if we multiply 10 by 6, we get (10 * 6) = 60. Therefore, in this case, half of 20 multiplied by 6 is 60.
By using this formula, we can find out the result for any given number. To summarize, to calculate what half of a number multiplied by 6 is, we divide the number by 2 and then multiply the result by 6.
Multiplying fractions can seem daunting at first, but once you grasp the concept, it becomes much easier. To multiply fractions, you follow a straightforward process.
To multiply two fractions, start by multiplying their numerators together. The numerator represents the number of parts you want to multiply. Next, multiply their denominators together. The denominator represents the total number of parts in each fraction. These two products form the new numerator and denominator of the resulting fraction.
For example, let's multiply 1/3 by 2/5. Multiply the numerators together: 1 x 2 = 2. Then, multiply the denominators together: 3 x 5 = 15. This gives us the resulting fraction of 2/15.
Remember that when multiplying fractions, it is important to simplify the resulting fraction if possible. In our example above, the fraction 2/15 is already simplified, so we leave it as is. However, if the numerator and denominator have common factors, you can reduce them by dividing both by their greatest common divisor.
Practice is key to improving your skills in multiplying fractions. You can practice with various exercises and examples to gain confidence. As you become more comfortable, you can move on to more complex fractions or mixed numbers.
Multiplying fractions is an important skill in many mathematical concepts, such as multiplying mixed numbers, solving algebraic expressions, and even in everyday situations like cooking or scaling measurements. Understanding how to multiply fractions will undoubtedly be beneficial in various aspects of your life.