Tim,

Sorry didn't bother to mention my name is Tina. Anyway something has flipped im
my browser because I used to be able to read the solutions page (with the sienna
background) in the past.

Does this mean I will not be able to view your solution to the Dorabella Cipher?
:(

Regards Tina

--- In UnsolvedProblems@yahoogroups.com, Tim Roberts <tsr21@...> wrote:
>
> Sorry, can't help.  Maybe your browser settings are not right?
>
> By the way, a real name would be good.
>
> Tim
>
>
>
>
> ________________________________
> From: whotoldyouthat <geneticassisted@...>
> To: UnsolvedProblems@yahoogroups.com
> Sent: Sunday, August 9, 2009 7:04:39 PM
> Subject: [UnsolvedProblems] Re: dorabella cipher
>
>  
> --- In UnsolvedProblems@ yahoogroups. com, "Tim Roberts" <tsr21@> wrote:
> >
> > I believe I've solved the Dorabella cipher. It turns out to be a pure
substitution cipher. Please see the solutions page, the three files at #12.
> > http://unsolvedproblems.org/
> >
> > Tim
> Refresh didn't work - I keep getting this:
>
> Text Box: In Number Theory, Logic, and Cryptography
>
> Text Box: This page provides a means for authors to have their proposed
solutions published. Details will include the name and email address of the
author, and the date and time of first submission. #01: Submitted by Jeffrey
Cook, 23.00 GMT, Wednesday 23rd May 2007. A proposed proof of the Riemann
Hypothesis. I introduce a function useful for defining any random or seemingly
random values whether involving figures divided by zero, undefined and infinite
limits of both real and imaginary numbers. With this function and a number of
related, provable theorems, it is shown that the Riemann Hypothesis is true and
brings into play the notion put forth by Jordan that a simple closed curve
contains two discontinuous regionsâ€"an inside and an outside... Click here for
full text. #02: Submitted by George Hoschel Jr., 3.30 GMT, Tuesday 1st May 2007.
A proposed solution to the Dorabella Cipher. "Oh, has P. dub belle you? Gee, I'd
dub belle you..." Click here for
> full text. #03: Submitted by Greg Orme, 9.45 GMT, Thursday 24th May 2007. A
proposed proof of the Riemann Hypothesis. The aim of the proof is first to
demonstrate that selecting N random numbers, as shown by Reuben and Hersh, that
there is an equal chance of selecting a number with an odd or even number of
factors. Then the aim is to show that this also applies from 1 to N... Click
here for full text. #04: Submitted by Tony Gaffney, 1.00 GMT, Thursday 5th July
2007. A proposed solution to the Dorabella Cipher. "B (Bella) hellcat i.e. war
using...." Click here for full text. #05: Submitted by Tim Roberts, 15.00 GMT,
Tuesday 29th January 2008. A contribution to the Odd Perfect Number problem. "It
has been known since the time of Euler that an odd perfect number N (if it
exists) must have the form N = paQ2... " Click here for full text. #06:
Submitted by Sylvain Julien, and Quentin Guignard 13.00 GMT, Thursday 1st
January 2009. A proposed solution to the
> Goldbach Conjecture. "Consider a composite natural number n greater or equal
to 4. We aim at proving that there is at least one natural number r such as
(n-r) and (n+r) are both primes. For obvious reasons r<n-2. Such a number r will
be called a "primality radius" of n..." Click here for full text. #07: Submitted
by Vernon H Graves 10.30 GMT, Friday 9th January 2009. A proposed disproof of
the existence of an Euler Brick. IMPORTANT NOTE: the author acknowledges a
significant error in the main proof. However, the solution as provided is still
presented here in the hope that the lines of reasoning may inspire others. Click
here for full text. #08: Submitted by Nafets Azereb 10.30 GMT, Thursday 12th
March 2009. A proposed disproof of the existence of an odd perfect number. "All
consecutive odd numbers (from 1) added together form always a square. Imagine a
square x^2 built by odd numbers (added together) from 1 to F[g]…". Click here
for full text....
> #12: Submitted by Tim Roberts, 15.00 GMT, Sunday 24th May 2009. A possible
solution to the Dorabella Cipher. "P.S. Now droop beige weeds…. " Click here
for explanatory notes in Word format, click here for a spreadsheet with the
ciphertext, plaintext, and character/letter correspondences, and click here for
the cipher key. â€"â€"â€"â€"â€"â€"â€"â€"â€"â€"â€"- This web site developed and
maintained by Tim S Roberts Email: timro21@gmail. com
>
> >
>