# LCM of Decimals Calculator

LCM of Decimals Calculator: Least Common Multiple or Lowest Common Multiple is the smallest among the common multiples of two or more numbers. By the end of this article, you will learn how to find the LCM of two or more numbers in Decimal. We have mentioned with enough examples explaining the step by step procedure for finding the Least Common Multiple(LCM) for two or more numbers in decimal format.

## LCM or two or more Decimals Calculator

Enter two or more decimals separated by "commas"

LCM of:

Here are some samples of LCM of Decimals calculations.

Related Calculators:

### How to find LCM of two numbers in Decimal - Steps

Follow the simple and easy guidelines while calculating the LCM of Decimals for two numbers and more. You will arrive at the solution easily by following the simple hacks prevailing.

Step 1: Firstly, convert each of the decimals to like decimals by multiplying with 10, 100, or 1000…....

For instance, if you have 0.5 and 0.35, find the number having more digits after the decimal. Here in this case, 0.35 is having more digits that is 2 digits.

Multiply both the numbers 0.5 and 0.35 with 100 to make them into integers.

Step 2: Remove the decimal point and find the Least Common Multiple of the integers you have got in the initial step.

Step 3: Divide the LCM you got in the second step by the number you have multiplied the given decimals in the initial step.

Let’s get into the further sections explaining the step by step solutions on how to find the Least Common Multiple for Decimals with some examples.

### Examples of Finding LCM of Two numbers in Decimal

Example 1: Find the least common multiple of 0.36 and 0.27?

Solution:

Given numbers are 0.36 and 0.27. The number of digits in both the numbers after the decimal point is 2.

Thus, in order to get rid of the decimal point we need to multiply both of them with 100. On doing so, they are as follows

0.36 x 100 = 36

0.27 x 100= 27

On finding the LCM of 36, 27 we get the Least Common Multiple as 108

LCM of 36, 27 = 108

Divide the result you got with the number you multiplied to make it as integer in the first step. In this case, we need to divide by 100 as we used it to make the given numbers into integers.

On dividing the LCM 108/100 we get 1.08

Thus the Least Common Multiple of 0.36 and 0.27 is 1.08

Example 2: Find the LCM of 1.20 and 22.5?

Solution:

Given Numbers are 1.20 and 22.5 The highest number of digits after the decimal point in the given case is 2

To get rid of the decimal point you need to multiply the numbers with 100. On doing you will get the results as such

1.20 x 100=120

22.50 x 100=2250

On finding the LCM of 120 and 2250 you will get the result as 9000

LCM of 120 and 2250 = 9000

Divide the result you got with the number you multiplied to make it as integer in the first step. In this case, we need to divide by 100 as

we used it to make the given numbers into integers.

On dividing the LCM 9000/100 we get 90

Thus, the least common multiple of 1.20 and 22.5 is 90

Lcmgcf.com covers full-fledge knowledge about the concept, formulas, how to find, and provides LCM of Decimals calculator to assist you during your homework by offering quick answers.

### FAQs on LCM of two numbers in decimal?

1. How to find LCM of two numbers in decimal?

You can get the detailed description of how to find the Least Common Multiple of two numbers in decimal by referring above.

2. What is LCM of Two numbers in decimal?

LCM (Least Common Multiple) of two numbers in decimal is the smallest number which can be divided by both numbers.

3. Where can I get Worked Out Examples for LCM of two numbers in Decimals?

You can get Worked out examples of LCM of two numbers in decimal from this page. All of them are given a pin to pin description so that you can understand them easily.

After going through the above stuff, I hope you understood how to find LCM of two numbers in Decimal. If you have any other queries feel free to ask us so that we can get back to you and solve your queries at the earliest possible. 