3 years, 22 days

## big thanks...

Thank you Carl Love,

I really appreciate it.

I used your line of code, and I got a whole list of good data.  I learned that

If f(y) = y^2+y+19 then f(z^2+2*z+19) factors algebraically as (z^2+z+19)*(z^2+3*z+41).

For me, this is great.  It goes along with the other work I did about  y^2+y+41.

Regards,

Matt

## Nice...

Daniel,

You made a very nice demonstration of Maple commands.  The pictures are pretty.

Regards,

Matt

Regards,

Matt

## @Rouben Rostamian  Thank you for th...

@Rouben Rostamian  Thank you for the reply.  I appreciate it.  Matt

## @Carl Love Thanks again Carl.  ...

@Carl Love Thanks again Carl.  Your corrections and knowledge are useful.

## @Kitonum Thank you Kitonum.  T...

@Kitonum Thank you Kitonum.  This makes a small step forward for me.

## @Carl Love Thanks Carl and all thos...

@Carl Love Thanks Carl and all those who have responded so far.  I appreciate the expertise that you have with this Maple tool.  And I learned something.  I was able to apply the 'rsolve' command successfully.

fibonacci_with_variable_coefficients_and_starting_values.pdf

Regards,

Matt

## Hi all, Thank you for all the kind repl...

Hi all,

Thank you for all the kind replies regarding this Maple computer code.

Regards,

Matt

## @acer Thank you for writing this co...

@acer Thank you for writing this code.  I have submitted it to the Online Encyclopedia of Integer Sequences, specifically  oeis.org/draft/A027750/ Let me know if you want credit for writing the Maple code.

## to clear frations...

128*c

This is the greatest common denominator, and it simplifies the expression somewhat.

For what its worth.
Matt

## @Kitonum Hi Kitonium, thank you for...

@Kitonum Hi Kitonium, thank you for taking the time to modify your Maple code for me.  I was able to compile it.  Regards, Matt

## @Kitonum Hi there,  Thank you ...

@Kitonum Hi there,  Thank you for taking the time to write 2 procedures.  I appreciate that.  Unfortunately, I only have Maple  17, and was unable to run the code.  See attachments -

partition_doodle.pdf

Again, thanks.

Regards,
Matt

## a fun fact to know and tell...

I am pretty sure that an integer has an odd number of divisors if and only if that integer is a square.

Matt

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