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Re: How precisely can a right angle be measured?
Posted:
Apr 6, 2013 12:02 PM


On Wednesday, April 3, 2013 5:56:46 AM UTC5, Tom Potter wrote: > "Poutnik" <poutnik@privacy.invalid> wrote in message news:MPG.2bc53fb062451f1810a7@news.eternalseptember.org... > > Absolutely Vertical posted Tue, 02 Apr 2013 09:25:01 0500 > >> >> > I know how to create an ORTHOGONAL standard >> > that is accurate to 1x10^10 or better, >> > >> >> why do you think such a standard is required? > > I suppose it would be very challenging > wrt material, thermal and mechanical stability. > > Regarding wavelength multiples as Will mentioned.... > > If Tom wants 10^10 precision ( accuracy is different story ), > the requirement is roughly > 1m versus 0.1 nm  1 small atom, or > near 6 km versus 579 nm of sodium D line. > > Or multiple of above for multiples of WLs. > >  > Poutnik Actually you can establish an extremely precise ORTHOGONAL standard for very little money.  Tom Potter http://thecloudmachine.tk http://tiny.im/390k
This is an oxymoron and demonstrates the confusion in current mathematics.There are certain standards as under, if current mathematicians would get out of thier grooves
1.sqrt(2)
2.Pythogoras theorem at 1:3(360/19precise correct degrees)
3. You can correct 90 degrees to the correct Pi as we have recently shown in the published papers as shown below, in the trigonometry section of the Unified theorem , but most of you are so obsessed with your current confused theory of Mathematics that it is hard to Change , but the author has recorded the facts by publishing the facts.CORRECT PI VALUE IS MATHEMATICALLY ALIGNED TO THE RIGHT ANGLE
References: 1] The unified Theorem at 1 (Vedic Zero), International Journal of Mathematics research, 2(2) (2013 221251) [2] Cameron .V, The disproof and fall of the Riemann?s hypothesis by quadratic base: The correct variable distribution of prime numbers by the clear mathematics of the halfline values (?Chan function?) of prime numbers, International Journal of Applied Mathematical Research, 2 (1) (2013) 103110. [3] Cameron V, den Otter T. Prime numbers 2012. Jam Sci 2012; 8(7):329334]. (ISSN: 15451003), http://www.jofamericanscience.org. [4] Cameron V, Prime number Coordinates and calculus J Am Sci, 2012; 8(10):910]. (ISSN: 15451003).http://www.jofamericanscience.org [4] Prime number19, Vedic Zero and the fall of western mathematics by theorem. International journal of applied mathematical research 2(1) (2013)111115 [5] The rational variability of all empty space by prime number: International journal of applied mathematical research, 2(2) (2013)157174



