ChatterBank0 min ago
Maths again Exponential expansion
11 Answers
the question is
find a and b in termns of n if the expansions of (1+x)n and exp ( ax/(1+bx)) are the same up to x2
(1+x)n is easyy 1 +nx + n(n-1)/2! x2 etc
but the exponent : 1 + ax/1+bx + a2x2/(1+bx)2/2!...
still doesnt give ascending powers of x
so I am not able to equate and compare coefficients
please help (a level 1968)
find a and b in termns of n if the expansions of (1+x)n and exp ( ax/(1+bx)) are the same up to x2
(1+x)n is easyy 1 +nx + n(n-1)/2! x2 etc
but the exponent : 1 + ax/1+bx + a2x2/(1+bx)2/2!...
still doesnt give ascending powers of x
so I am not able to equate and compare coefficients
please help (a level 1968)
Answers
1 to 11 of 11
If you look again carefully you will see that it is correct. Here is a link to a pdf file which shows how it works very clearly:
ht
ht
10:16 Fri 06th Jan 2012
I think you should solve it this way:
Write ax/(1+bx) as ax(1+bx)^-1 and expand as
ax(1-bx+b^2x^2+terms in x^3 or above)
so exp(ax(1-bx+b^2x^2+terms in x^3 or above)) is:
1+ax(1-bx+b^2x^2+terms in x^3 or above)+a^2x^2(1-bx+b^2x^2+terms in x^3 or above)^2
=1+ax-abx^2+a^2x^2+terms in x^3 or above.
If the x terms and x^2 terms in this series must be the same as those of
(1+x)^n=1+nx+n(n-1)x^2+terms in x^3 or above, then
a=n and n^2-nb=n(n-1)/2, so b=(n+1)/2 as long as n is not equal to 0.
You can see that this works for n=1 giving a=1 and b=1
and for n=2 giving a=2 and b=3/2
Write ax/(1+bx) as ax(1+bx)^-1 and expand as
ax(1-bx+b^2x^2+terms in x^3 or above)
so exp(ax(1-bx+b^2x^2+terms in x^3 or above)) is:
1+ax(1-bx+b^2x^2+terms in x^3 or above)+a^2x^2(1-bx+b^2x^2+terms in x^3 or above)^2
=1+ax-abx^2+a^2x^2+terms in x^3 or above.
If the x terms and x^2 terms in this series must be the same as those of
(1+x)^n=1+nx+n(n-1)x^2+terms in x^3 or above, then
a=n and n^2-nb=n(n-1)/2, so b=(n+1)/2 as long as n is not equal to 0.
You can see that this works for n=1 giving a=1 and b=1
and for n=2 giving a=2 and b=3/2
If you look again carefully you will see that it is correct. Here is a link to a pdf file which shows how it works very clearly:
https://docs.google.c...yMzctYjYxMTRmMDAwMzRh
https://docs.google.c...yMzctYjYxMTRmMDAwMzRh
excellent ! I made it onto google docs and your answer made sense AND gave a reason why they made it up all those years ago
ALSO - you know I anwered this q in 1968 and got it out but couldnt remember how I had done it
also in getting me to think about it -for which I thank you - I saw that the alternative is to expand exp (ax(1-bx) to exp (ax - abx2) as exp(ax)exp(-abx2) as
(1+ax +a2x2/2.......)(1-abx2/2......) which lead to the same exp when multiplied out viz....
1 + ax + (a2/2-ab)x2
I thank you very very much and can asterisk your answer as the BEST as the toggle seems to be dead - manuy thanks again
ALSO - you know I anwered this q in 1968 and got it out but couldnt remember how I had done it
also in getting me to think about it -for which I thank you - I saw that the alternative is to expand exp (ax(1-bx) to exp (ax - abx2) as exp(ax)exp(-abx2) as
(1+ax +a2x2/2.......)(1-abx2/2......) which lead to the same exp when multiplied out viz....
1 + ax + (a2/2-ab)x2
I thank you very very much and can asterisk your answer as the BEST as the toggle seems to be dead - manuy thanks again
1 to 11 of 11
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