relation between lcm and
Hcf
Answers
Answered by
1
For any two given numbers, the product of their LCM and HCF is
equal to the product of the numbers themselves. The HCF of any set
of numbers is smaller than or equal to the smallest number.
The LCM of any set of numbers is greater than or equal to the
largest number. The HCF of any set of numbers is a factor of their
LCM, and the LCM is a multiple of their HCF. The LCM of the
given numbers is a multiple of their HCF. If the HCF of two numbers
is one of the numbers, then their LCM is the other number.
The HCF of two co-prime numbers is 1, and their LCM is the product
of the numbers themselves.
ranbirsinghofsd:
Lcm= lowest common mutiple
Hcf=highest common factor
Answered by
0
if A and B are two numbers.
LCF of A, B is L
HCF of A, B is H
Then A×B = L×H
if numbers are greater than two, then
if A, B and C are numbers, then
LCM(A, B, C) = LCM(LCM(A, B), C)
and we can use the product relationship
Simillarly
LCM(A, B, C, D, ....) = LCM(LCM(LCM(C, D....), B), A)
LCF of A, B is L
HCF of A, B is H
Then A×B = L×H
if numbers are greater than two, then
if A, B and C are numbers, then
LCM(A, B, C) = LCM(LCM(A, B), C)
and we can use the product relationship
Simillarly
LCM(A, B, C, D, ....) = LCM(LCM(LCM(C, D....), B), A)
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