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Simple induction proof (1 Viewer)

Run hard@thehsc

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the proof is ease, but I am messing up somewhere in the last step regarding the factorisation - thanks for the help:
1646547601336.png
 

5uckerberg

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So you're on the n=k+1 step. Alright.

Start with this


For the n=k+1 case


Notice that for the n=k case
.

Thus, for the n=k+1 case


Working with the LHS
is just
using the assumption made from the n=k statement

Cleaning this up on the LHS we will have

That simply gives us

equalling the RHS.

The rest is up to you. But I recommend to write your induction proof as if you are completing an essay according to Bill Pender.
 

yanujw

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Assuming you could do the 'prove true for n=1' part...

Assume true for n=k;
2^r(r+1) + 2^(r+1)(r+2) + ... + 2^k(k+1) = k2^(k+1)

Prove true for n=k+1;
LHS = 2^r(r+1) + 2^(r+1)(r+2) + ... + 2^k(k+1) + 2^(k+1)(k+2)
= k2^(k+1) +2^(k+1)(k+2) by induction hypothesis
= (2k+2)2^(k+1)
=(k+1)2^(k+2)
= RHS when n=k+1

True for n=k+1 when true for n=k

By math induction, statement is true for postive integers n.
 

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