Proof by Induction Help Discrete Math? I've gotten the equation down to this: (k(k+1)(2k+3))/(2(2k+1)(2k+3))+(2(k+1)^2)/(2(2k+1)(2k+3))+((k+1)(k+2))/(2(2k+3))

Koronicaqn

Koronicaqn

Answered question

2022-09-04

Proof by Induction Help Discrete Math?
So I've gotten to a point in this induction problem where I really don't know where to go.
I've gotten the equation down to this:
k ( k + 1 ) ( 2 k + 3 ) 2 ( 2 k + 1 ) ( 2 k + 3 ) + 2 ( k + 1 ) 2 2 ( 2 k + 1 ) ( 2 k + 3 ) = ( k + 1 ) ( k + 2 ) 2 ( 2 k + 3 )
Original problem was this:
1 2 1 ( 3 ) + 2 2 2 ( 3 ) + . . . + n 2 ( 2 n 1 ) ( 2 n + 1 ) = n ( n + 1 ) 2 ( 2 n + 1 )

Answer & Explanation

ko1la2h1qc

ko1la2h1qc

Beginner2022-09-05Added 18 answers

Step 1
Ok, I am not sure how you got the first equation, but this is how you would prove this, assuming that you have already proven the base case (whatever that may be). Then, you assume this holds for n = k (Induction Hypothesis). That is,
1 2 1 ( 3 ) + 2 2 2 ( 3 ) + . . . + k 2 ( 2 k 1 ) ( 2 k + 1 ) = k ( k + 1 ) 2 ( 2 k + 1 )
Now, you need to show that this holds for n = k + 1. In other words, that,
1 2 1 ( 3 ) + 2 2 2 ( 3 ) + . . . + ( k + 1 ) 2 ( 2 k + 1 ) ( 2 k + 3 ) = ( k + 1 ) ( k + 2 ) 2 ( 2 k + 3 )
Step 2
However, we know that the
i = 1 k + 1 i 2 ( 2 i 1 ) ( 2 i + 1 ) = ( i = 1 k i 2 ( 2 i 1 ) ( 2 i + 1 ) ) + ( k + 1 ) 2 ( 2 k + 1 ) ( 2 k + 3 )
(Meaning that the summation to k + 1 is the summation to k plus the k + 1 term.) So, by substituting the value of the summation to k (Induction Hypothesis), we get:
i = 1 k + 1 i 2 ( 2 i 1 ) ( 2 i + 1 ) = k ( k + 1 ) 2 ( 2 k + 1 ) + ( k + 1 ) 2 ( 2 k + 1 ) ( 2 k + 3 )
Now, you show that
k ( k + 1 ) 2 ( 2 k + 1 ) + ( k + 1 ) 2 ( 2 k + 1 ) ( 2 k + 3 ) = ( k + 1 ) ( k + 2 ) 2 ( 2 k + 3 )
to finish the proof.
Dante Patton

Dante Patton

Beginner2022-09-06Added 10 answers

Step 1
Combine like terms:
k ( k + 1 ) ( 2 k + 3 ) 2 ( 2 k + 1 ) ( 2 k + 3 ) + 2 ( k + 1 ) 2 2 ( 2 k + 1 ) ( 2 k + 3 ) = k ( k + 1 ) ( 2 k + 3 ) + 2 ( k + 1 ) 2 2 ( 2 k + 1 ) ( 2 k + 3 )
Expand the numerator, then take out 2 ( k + 1 ) from the top and bottom to get the correct result.
Step 2
Numerator becomes:
k ( k + 1 ) ( 2 k + 3 ) + 2 ( k 2 + 2 k + 1 ) = 2 k 3 + 7 k 2 + 7 k + 2
Now, factor out 2 k + 1 by long division if necessary to get:
2 k 3 + 7 k 2 + 7 k + 2 = ( 2 k + 1 ) ( k + 2 ) ( k + 1 )
Now, the 2 k + 1 terms cancel, leaving you with the same equation.

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