A question from Discrete Mathematics. Topic Summations. Compute the following summatio

preprekomW

preprekomW

Answered question

2021-08-17

A question from Discrete Mathematics. Topic Summations.
Compute the following summation:
k=12k(1+k)k(k+1)
k=1

Answer & Explanation

hesgidiauE

hesgidiauE

Skilled2021-08-18Added 106 answers

Step 1
Given summation is:
k=12k(1+k)k(k+1)
Let 2k(k+1)=n
Then, the given summation rearranges into:
n=4nn2=12n=4nn
Bring it to the standard summation:
n=1nn=n(n+1)2
So add n=1,2 and 3 for the summation and delete the sum of these numbers from the whole summation.
That is:
12n=4nn=12(n=1nn)12(1+2+3)
=12(n=1nn)3
Use the basic standard summation result above to simplify above.
12(n=1nn)3=n(n+1)43
Step 2
Now. replace n with 2k(k+1)
n(n+1)43=2k(k+1)[2k(k+1)+1]43
For k=1, the result of the summation is:
2(1+1)[2(1+1)+1]43=2
Therefore, the value of the summation at k=1 is 2.

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