the product of two number is 3750 and their LCM is 150 find the LCM of these number
Answers
Answered by
100
Heya !!!
Product of two numbers = 3750
And,
LCM of two numbers = 150
We know that,
Product of two numbers = HCF × LCM
3750 = HCF × 150
HCF = 3750/150
HCF = 25
Hence,
HCF of two numbers = 25
HOPE IT WILL HELP YOU....... :-)
Product of two numbers = 3750
And,
LCM of two numbers = 150
We know that,
Product of two numbers = HCF × LCM
3750 = HCF × 150
HCF = 3750/150
HCF = 25
Hence,
HCF of two numbers = 25
HOPE IT WILL HELP YOU....... :-)
Answered by
2
Answer:
25
Step-by-step explanation:
Given:- The product of two numbers is 3750.
The LCM of these two numbers is 150.
To find:- HCF of the numbers.
Solution:-
As we know, Product of two numbers is equal to product of Least common multiple (LCM) and Highest common factor (HCF).
Product of numbers = Least Common Multiple × Highest Common Factor
Product of the numbers is 3750 and LCM is 150.
According to question,
3750 = LCM × HCF
⇒ 3750 = 150 × HCF
⇒ HCF = 3750 ÷ 150
⇒ HCF = 25
Therefore, Highest common factor of the numbers will be 25.
To verify, 25 × 150 = 3750
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To Learn more about this concept, visit the below link
https://brainly.in/question/3021620
https://brainly.in/question/3698781
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