If ratio of AM and GM of two numbers is $5/4$ , what are the numbers and what is their HM?

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Answer 1 · 2017-10-06T08:23:51

Numbers are $2$ and $8$ . Their H.M. is $16/5$ .

Let the two numbers be $a$ and $b$ .

Their A.M. is $(a+b)/2$ and as G.M. is $sqrt(ab)$

and as ratio between A.M. and G.M. is $5/4$

$((a+b)/2)/(sqrt(ab))=5/4$

or $2a+2b=5sqrt(ab)$

or $4a^2+4b^2+8ab=25ab$

i.e. $4a^2+4b^2-17ab=0$

or $(4a-b)(a-4b)=0$

i.e. either $a/b=4$ or $b/a=4$

Hence numbers are of the form $x$ and $4x$

and their G.M. is $2x$ and H.M.@ will be $(2*x*4x)/(x+4x)$ or $(8x^2)/5x$ or $(8x/5)$
Further, as difference of G.M. and H.M. is $4/5$

$2x-8/5x=4/5$

or $2/5x=4/5$ and $x=2$

Hence numbers are $2$ and $8$ .

Observe their A.M. is $5$ , G.M. is $4$ and H.M. is $16/5$ .

@ If $h$ is H.M. between $a$ and $b$ ,

$1/a,1/h,1/b$ are in arithmetic sequence and hence

$2(1/h)=1/a+1/b=(a+b)/(ab)$

and $1/h=(a+b)/(2ab)$ i.e. $h=(2ab)/(a+b)$

If ratio of AM and GM of two numbers is 5/45/4, what are the numbers and what is their HM?