Q15 (1 Viewer)

Rafy

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Discuss your answers to Q15 here.
 

lolcakes52

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Re: General Thoughts: Mathematics Ext 2

I put my solutions to 16 here http://community.boredofstudies.org/showthread.php?t=293623
for 15
ai) simple expansion of the difference of two roots being greater than zero
aii) (x-1)>=0 , y-x>=0 multiply and your done
aiii) the left inequality is part ii, the right is part i.
iv) didn't attempt

bi) conjugate root theorem, mention that the conjugate of ia is -i*the conjugate of a.
ii) split the third term of the polynomial into two parts and factorise the two parts
iii) didn't do
iv) product of the roots, then say something about how conjugate alpha times alpha is the modulus of alpha
v) sum of roots
vi)didnt do
 

v1

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Q15
a) (iv) using iii) 1<=j<=n
sqrt(n) <= sqrt(j(n-j+1)) <= (n+1)/2
let j=1,2,3...n and multiply them all
sqrt(n^n) <= sqrt([1*2*3....*n][n*(n-1)*(n-2)...1] <= [(n+1)/2]^n
sqrt(n^n) <= sqrt([n!][n!]) <= [(n+1)/2]^n
sqrt(n^n) <= n! <= [(n+1)/2]^n
 
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SoresuMakashi

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Q15
a) (iv) using iii) 1<=j<=n
sqrt(n) <= sqrt(j(n-j+1)) <= (n+1)/2
let j=1,2,3...n and multiply them all
sqrt(n^n) <= sqrt([1*2*3....*n][n*(n-1)*(n-2)...1] <= [(n+1)/2]^n
sqrt(n^n) <= sqrt([n!][n!]) <= [(n+1)/2]^n
sqrt(n^n) <= n! <= [(n+1)/2]^n
Very nice.
 

KappaD

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Sorry, but how did you guys do b) iii)? Having a durp moment here
 

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