Asked by Shohanur
A. Find 3 pairs of numbers for which the least common multiple equals the product of the the 2 numbers.
B. Look at the pairs of numbers you found in part a. What is true about all 3 pairs of numbers?
B. Look at the pairs of numbers you found in part a. What is true about all 3 pairs of numbers?
Answers
Answered by
Reiny
(3,4) , (2,7) , (12, 199)
for the A. to be true , the numbers have to be relatively prime, that is, they cannot have a common factor between them.
counter-example
(6,20)
least common multiple is 60 , which is not the product of the 2 numbers, since they have a common factor of 2 between them.
for the A. to be true , the numbers have to be relatively prime, that is, they cannot have a common factor between them.
counter-example
(6,20)
least common multiple is 60 , which is not the product of the 2 numbers, since they have a common factor of 2 between them.
Answered by
I dont care...
Really? Literally ALL these people giving answers clearly don't know what the question in. What 3 PAIRS, not three or four. And we all know how to GET the LCM! People are wondering how to solve the PROBLEM SHOWN. Maybe you should READ it a couple times before you make your answer...
Answered by
Deez nuts
Idk and idc
Answered by
bob
hello the answer is 8,6,3,3,3,
Answered by
Juan
36
Answered by
Yana
24/12
Answered by
not saying
a
c
b
d
a
c
b
d
a
Answered by
Aryani
What’s the damn answer
Answered by
Jack
How do I find 2 numbers where the product of those 2 numbers are also their LCM?
Answered by
Anonymous
huei kkjkj kjksdvhuhrfbbvuhfvvhow fjef jehfie
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