In math, 16 is a really big number. It’s the sum of 1, 6, 10, 16, and so on. And when you need to calculate 16 multiplied by 4 using long multiplication, it can be a little tricky. Luckily, we’ve got a guide for you that will teach you how to do just that in quick and easy steps. So stick with us as we take you through this simple calculation; it will help you understand the principles behind it and make it easier to apply them in future calculations 16 times 4.
What is long multiplication?
Multiplication is a process of multiplying two numbers together. In order to do this, you need to know the basics of long multiplication. Long multiplication is a type of multiplicative inverse. It is also known as augmented multiplication or by extension, exponential multiplication.
In mathematics, long multiplication is a multiplicative inverse operation that takes two numbers and produces their product as if they had been multiplied by a large number (i.e. thousands, millions, or billions).
The basic steps in performing long multiplication are 16 times 4:
1) Find the multiplicative inverse of the first number.
2) Add the multiplicative inverse of the second number to the original number.
3) The result will be the product of both numbers multiplied together.
How to do long multiplication using a calculator
To calculate multiplied by using long multiplication, follow these steps:
1) Enter the base number (in this example, 4) and the multiplier (in this example, 8).
2) Press the “X” key on your calculator to enter the infinite decimal mode.
3) Type in the numerator (14 in this example) and press the “=” key.
4) Type in the denominator (24 in this example) and press the “<=” key.
5) Press the “ENTER” key to submit your answer.
How to do long multiplication using our method
There are two main ways to do long multiplication: with a calculator and with our method.
With a calculator, you would start by entering the multiplicands and multiplier, followed by the dividend (the number you want to multiply), and then pressing the “Calculate” button.
With our method, you would start by dividing the multiplicand by the dividend (to get your quotient), and then multiplying that quotient by the multiplier.
Here is an example: if you wanted to calculate multiplied by 5, you would first divide 5 by 1 (5 ÷ 1 = 0.5), and then multiply that 0.5 by 3 (3).
How to use the result of long multiplication in a problem
When multiplying large numbers, it is helpful to use the result of long multiplication. This can be done by remembering the rule for long multiplication: the product of two consecutive integers is the sum of their digits (1, 2, 3, 4, 5, 6). For example, 9 × 16 = 144. To multiply 9 and 16 using long multiplication, take the first number (9) and multiply it by 5 (3 + 4), then add the second number (16). That is 45 (9 + 16).