What are the properties of Least Common Multiple of Two Numbers?
1. The LCM of any set of integers is a multiple of each of those integers.
2. The LCM of two integers is equal to the product of those integers divided by their highest common factor (HCF). This is also known as the Euclidean algorithm for finding the LCM.
3. The LCM of a set of integers is the product of their prime factorization, with each prime raised to the highest power present in any of the integers.
4. LCM is distributive over addition and subtraction: LCM(a+b,c) = LCM(a,c) x LCM(b,c) = LCM(a,b,c) and LCM(a,b) = LCM(a,c) x LCM(b,c) = LCM(a,b,c)
5. If the LCM of two numbers is equal to the product of those numbers, then they are relatively prime to each other or in another way they are co-primes.
How to Calculate LCM of Two Numbers given HCF and Product?
LCM of Two Numbers given HCF and Product calculator uses Least Common Multiple of Two Numbers = Product of Two Numbers/Highest Common Factor of Two Numbers to calculate the Least Common Multiple of Two Numbers, LCM of Two Numbers given HCF and Product formula is defined as the least positive integer other than zero that is divisible by both numbers, and calculated using the highest common factor and product of those two numbers. Least Common Multiple of Two Numbers is denoted by LCM_{(X, Y)} symbol.
How to calculate LCM of Two Numbers given HCF and Product using this online calculator? To use this online calculator for LCM of Two Numbers given HCF and Product, enter Product of Two Numbers (P_{(X×Y)}) & Highest Common Factor of Two Numbers (HCF_{(X, Y)}) and hit the calculate button. Here is how the LCM of Two Numbers given HCF and Product calculation can be explained with given input values -> 9 = 45/5.