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Binomial theorem help (1 Viewer)
- Thread starter luvotomy
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lyounamu
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x^4: nC4 . (3)^(n-4) . (-x)^4 = nC4 . 3^(n-4) x^4luvotomy said:
x^5: nC5 . (3)^(n-5) . (-x)^5 = -nC5 . 3^ (n-4) x^5
So nC4 . 3^(n-4) = nC5 . (3)^(n-5) since they are same in magnitude (ignoring the sign)
3nC4 = nC5
3 . n!/(n-4)!4! = n!/(n-5)5!
15/(n-4)! = 1/(n-5)!
15/(n-4)(n-5)! = 1/(n-5)!
15/(n-4) = 1
15 = n-4
n= 19
Hope my working out explained itself.
tommykins
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回复: Binomial theorem help
I'll have a shot, but binomial is my weakest 3u topic.
(3-x)^n = nck.(-x)^k.3^n-k
When k = 4 and 5, the coeff's are equal in magnitude.
nc4.3^n-4 = nc5.3^n-5
nc4.3^n.3^-4 = nc5.3^n.3^-4.3^-1.3^n
nc4 = nc5.3^-1
3nc4 = nc5
Use the formula and solve from there.
I'll have a shot, but binomial is my weakest 3u topic.
(3-x)^n = nck.(-x)^k.3^n-k
When k = 4 and 5, the coeff's are equal in magnitude.
nc4.3^n-4 = nc5.3^n-5
nc4.3^n.3^-4 = nc5.3^n.3^-4.3^-1.3^n
nc4 = nc5.3^-1
3nc4 = nc5
Use the formula and solve from there.