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Limiting Ratio (Posted on 2011-04-22)

F(n) is a function defined as:

F(n) = Σ_{j=1 to n} j⁶/2^j

Evaluate this limit:

Limit F(n)
n → ∞

See The Solution Submitted by K Sengupta

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Analytic solution

Comment 3 of 3 |

F(n) = Sum(j=1 to n) of j⁶(1/2)^j

Define:             f(x) = Sum(j=1 to infinity) of j⁶x^j

                        f(x) =1⁶x + 2⁶x² + 3⁶x³ + 4⁶x⁴ + ...

Then:    lim F(n) as n -> infinity = f(1/2)

f(x) can be constructed from the geometric series: x + x² + x³ +.... = x/(1-x)

by repeating the following two steps six times: differentiate wrt x then multiply
by x. Thus, using D(y) to denote dy/dx:

                        f(x) = x*D(x*D(x*D(x*D(x*D(x*D(x/(1-x)))))))

Working out the RHS is tedious, but with the help of partial fractions and a few recurrence tricks you get:

                        f(x) = x(1 + 57x + 302x² + 302x³ + 57x⁴ + x⁵)/(1 - x)⁷

Thus:    Required limit = f(1/2) = 9366.

Posted by Harry on 2011-04-23 00:04:46

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