Write the relation between the two numbers and LCM, HCF of that numbers.
Answers
Answer:
1.The product of LCM and HCF of the given natural numbers is equivalent to the product of the given numbers.
- The product of LCM and HCF of the given natural numbers is equivalent to the product of the given numbers.From the given property, LCM × HCF of a number = Product of the Numbers
2.The LCM of given co-prime numbers is equal to the product of the numbers since the HCF of co-prime numbers is 1.
- The LCM of given co-prime numbers is equal to the product of the numbers since the HCF of co-prime numbers is 1.So, LCM of Co-prime Numbers = Product Of The Numbers
3.H.C.F. and L.C.M. of Fractions
- H.C.F. and L.C.M. of FractionsLCM of fractions = LCM of Numerators / HCF of Denominators
- HCF of fractions = HCF of Numerators / LCM of Denominators
Answer:
1.The product of LCM and HCF of the given natural numbers is equivalent to the product of the given numbers.
The product of LCM and HCF of the given natural numbers is equivalent to the product of the given numbers.From the given property, LCM × HCF of a number = Product of the Numbers
2.The LCM of given co-prime numbers is equal to the product of the numbers since the HCF of co-prime numbers is 1.
The LCM of given co-prime numbers is equal to the product of the numbers since the HCF of co-prime numbers is 1.So, LCM of Co-prime Numbers = Product Of The Numbers
3.H.C.F. and L.C.M. of Fractions
H.C.F. and L.C.M. of FractionsLCM of fractions = LCM of Numerators / HCF of Denominators
HCF of fractions = HCF of Numerators / LCM of Denominators
Step-by-step explanation:
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