Math Is Fun Forum
  Discussion about math, puzzles, games and fun.   Useful symbols: √ ∞ ≠ ≤ ≥ ≈ ⇒ ∈ Δ θ ∴ ∑ ∫ π -




Not registered yet?

#1 2008-05-08 08:37:33

Legendary Member


Fractional calculus


But what is

Meet fractional derivatives.

Last edited by JaneFairfax (2008-05-08 08:38:06)

Q: Who wrote the novels Mrs Dalloway and To the Lighthouse?

A: Click here for answer.

#2 2008-05-08 08:42:11



Re: Fractional calculus

Wow! From the article:

(And pi turns up in an unlikely spot again)

Which shows that (in general) if you can think of extending an idea in mathematics, you probably can! What's next ... complex powers?

"The physicists defer only to mathematicians, and the mathematicians defer only to God ..."  - Leon M. Lederman

#3 2008-05-08 17:13:10

Super Member
Award: Wink Alive


Re: Fractional calculus

. this is taking things too far tongue. Although interesting. I would like to see complex powers yes tongue

The Beginning Of All Things To End.
The End Of All Things To Come.

#4 2008-07-10 01:38:50

Power Member


Re: Fractional calculus

I've been thinking quite a bit about this (off and on) since it was first posted. When I first read the wiki, it was very much over my head, but now I think I get it. Some further thoughts (please correct me if I'm wrong):

Seeing how:

and it follows that:

for any whole number "n" is it fair to assume:

I think so. But that's easy. For my next trick I'll be using the trig identities:

I think you all probably already see where this is going:

And if "n" is expanded into all real numbers:

Is my logic sound? Does anyone have anymore half derivatives to add?

On a slightly unrelated note, what's the deal with the notation? I've never understood it... why is the second derivative:
and not

There are 10 types of people in the world, those who understand binary, those who don't, and those who can use induction.

#5 2008-07-10 01:49:12



Re: Fractional calculus

When you take the derivative of something, the notation is the change in that something over the change in x.  'd' simply stands for that change.  So it is:

Now we take the derivative of this entire thing.  That is, the change in dy/dx over the change in x.

The last step is because you treat "dx" as a single entity.  At least that's how I always reasoned it.

"In the real world, this would be a problem.  But in mathematics, we can just define a place where this problem doesn't exist.  So we'll go ahead and do that now..."

#6 2008-07-10 05:36:01

Power Member


Re: Fractional calculus

Ok, that makes a bit more sense, I never treated "dx" as a single entity, I always thought it was d(x) not (dx)

What about my other work? Any good or am I a little off?

There are 10 types of people in the world, those who understand binary, those who don't, and those who can use induction.

Board footer

Powered by FluxBB