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05 Jun 2020, 08:48
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
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Question Stats:
63% (02:29) correct
37%
(02:19)
wrong
based on 120
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If a and b are two distinct positive integers such that b > a, which of the following expressions is equivalent to the difference between the maximum and the minimum possible values of the ratio of the least common multiple of a and b to the highest common factor of a and b ?
A. \(\frac{a}{b}*(a + 1)(a - 1)\)
B. \(\frac{a}{b}*(b + 1)(b - 1)\)
C. \(\frac{b}{a}*(a + 1)(a - 1)\)
D. \(\frac{b}{a}*(b + 1)(b - 1)\)
E. \(b*(a + 1)(a - 1)\)
A. \(\frac{a}{b}*(a + 1)(a - 1)\)
B. \(\frac{a}{b}*(b + 1)(b - 1)\)
C. \(\frac{b}{a}*(a + 1)(a - 1)\)
D. \(\frac{b}{a}*(b + 1)(b - 1)\)
E. \(b*(a + 1)(a - 1)\)
05 Jun 2020, 08:58
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Max [ LCM (a,b) / HCF (a,b) ] = ab/1 , ie; a and b are co - primes.
Min [ LCM (a,b) / HCF (a,b) ] = b / a
Difference = ab - b/a = b(a^2-1)/a
Answer = C
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Min [ LCM (a,b) / HCF (a,b) ] = b / a
Difference = ab - b/a = b(a^2-1)/a
Answer = C
Posted from my mobile device
General Discussion
05 Jun 2020, 09:45
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IMO C
to find: Max (\(\frac{LCM(a,b)}{HCF(a,b)}\)) - Min (\(\frac{LCM(a,b)}{HCF(a,b)}\))
Please note: Fraction is Max when --> Num is max & Den is min
Fraction is Min when --> Num is Min & Den is max
Max (\(\frac{LCM(a,b)}{HCF(a,b)}\)) = a*b/1
Min (\(\frac{LCM(a,b)}{HCF(a,b)}\)) = \(\frac{b}{a}\)
Difference = ab- \(\frac{b}{a}\) = \(\frac{b}{a}\) (\(a^2\) - 1) = \(\frac{b}{a}\) (a+1) (a-1)
to find: Max (\(\frac{LCM(a,b)}{HCF(a,b)}\)) - Min (\(\frac{LCM(a,b)}{HCF(a,b)}\))
Please note: Fraction is Max when --> Num is max & Den is min
Fraction is Min when --> Num is Min & Den is max
Max (\(\frac{LCM(a,b)}{HCF(a,b)}\)) = a*b/1
Min (\(\frac{LCM(a,b)}{HCF(a,b)}\)) = \(\frac{b}{a}\)
Difference = ab- \(\frac{b}{a}\) = \(\frac{b}{a}\) (\(a^2\) - 1) = \(\frac{b}{a}\) (a+1) (a-1)
