Daily Maths Challenges

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submitted 1 year ago by siriusmart@lemmy.world to c/dailymaths@lemmy.world

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Show that the infinite multiplication (1+1/1)(1+1/2)(1+1/3)... does not converge.

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[–] zkfcfbzr@lemmy.world 1 points 1 year ago* (last edited 1 year ago)

solution

The terms can be rewritten as:

(2/1) * (3/2) * (4/3) * ... * ((n+1)/n) * ...

Each numerator will cancel with the next denominator. In total everything cancels, so the answer is the empty product, 1.

...Wait...

Uhm, ignore that. Rather, consider the products we get when multiplying. We get: 2/1. 6/2. 24/6. Etc. That is, we have:

Π (n = 1 to k) (n+1)/n = (k+1)! / k! = (k+1)k!/k! = k+1

k+1 clearly goes to infinity as k → ∞, so our product diverges to infinity.