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Inequalities question (1 Viewer)

middlemarch

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Can anybody help me with this question:

if x>0, n a positive integer>1 and nx<1 show that
1+nx < (1+x)^n < [1 / (1-nx) ]

Thanks
 

damo676767

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(1 + X)n = 1 + nC1X + nC2X2 + ... + nCnXn
= 1 + nX + nC2X2 + nC2X3 + ... + nCnXn
1 + nX = (1 + X)n - (nC2X2 + nC2X3 + ... + nCnXn)

1 + nX < (1 + X)n



(1 + X)-n > 1 *as 1 + X > 1

0 < nX *as n and X are both positive
-nX < 0
1 - nX < 1

(1 + X)-n > 1 - nX
(1 + X)n < 1/(1 - nX)

1 + nX < (1 + X)n < 1/(1 - nX)


do you want me to explain any of that, or does that make scence
 
Last edited:

robbo_145

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damo676767 said:
(1 + X)-n > 1 *as 1 + X > 1
as 1 + X > 1
1/(1+X)n < 1
hence
(1 + X)-n < 1

instead
1/(1-nX) - (1+X)n
= [ 1 - (1+X)n + nX(1+X)n] / ( 1-nX) * common denominator

using the first inequality (1+X)n > 1 + nX it becomes

> [1 - (1+nX) + nX(1 + nX)] / (1-nX)
> nX/1-nX
> 0 as 1-nX > 0 and nX >0

hence
1/(1-nX) - (1+X)n > 0
1/(1-nX) > (1+X)n
 
Last edited:

justchillin

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You could also tackle it graphically...just drawing what the curves are like for values up to n... might be quicker than other methods?
 

DRAGONZ

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robbo_145 said:
> [1 - (1+nX) + nX(1 + nX)] / (1-nX)
> nX/1-nX
> 0 as 1-nX > 0 and nX >0
Is it just me, or should that line ACTUALLY read:
> (n^2)(x^2) / (1 - nx)

In the end, it doesn't matter to the solution ... just being pedantic?
 

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