User talk:Twentythreethousand

You are a genious twentythree thousand. But the reciprocal of zero approaches positive infinity AND negative infinity. Can you guess what that means??????????????????????????????????????????????????????????????

pascal's triangle

(a+b+c+d+e)^4

1,4,6,6,6,6,4,12,12,24,24,12,24,12,4,12,12,12,24,12,4,12,12,12,4,1,4,6,6,6,4,12,4,12,12,12,24,12,4,12,12,12,12,4,1,4,6,6,4,12,4,12,4,,12,12,12,12,4,1,4,6,4,12,4,12,4,12,4,1

5*1

20*4

10*6

30*12

5*24

80

60

360

120

5

repunit

11111^4

1000004000010000020000035000052000068000080000085000080000068000052000035000020000010000004000001

1,4,10,20,35,52,68,80,85,80,68,52,35,20,10,4,1

1*2

4*2

10*2

20*2

35*2

52*2

68*2

80*2

85*1

Twentythreethousand (talk) 19:34, 6 April 2013 (UTC)[reply]

Thanks for uploading File:Mans number.jpg. You don't seem to have indicated the license status of the image. Wikipedia uses a set of image copyright tags to indicate this information; to add a tag to the image, select the appropriate tag from this list, click on this link, then click "Edit this page" and add the tag to the image's description. If there doesn't seem to be a suitable tag, the image is probably not appropriate for use on Wikipedia.

For help in choosing the correct tag, or for any other questions, leave a message on Wikipedia:Media copyright questions. Thank you for your cooperation. --ImageTaggingBot (talk) 19:10, 12 December 2007 (UTC) [reply]

Your File:Mans number.jpg

The image Man's number.jpg is a candidate to be copied to the Wikimedia Commons. When you uploaded this image, you licensed it for use under the GNU Free Documentation License (GFDL). On behalf of the Wikipedia and Commons communities, thank you. However, the GFDL requires that reproductions of the image (and any other GFDL-licenced works), must be accompanied by the full text of the GFDL. The GFDL is intended more for documentation and not images, so downstream re-users may be hindered by additional restrictions of the GFDL which may not work well on the use of one image.

Before I copy this image to the Commons, I wanted to ask whether you would be willing to multilicense your work under an additional license, such as a Creative Commons licence. Creative Commons licences, such as the Attribution Share-Alike license provide a similar copyleft permission to the GFDL, but without some of its requirements such as the distribution of the licence text. All you need to do, is place the additional license tag alongside your current license. Users can choose between which one they want to use the image under. There are many free licenses accepted on Wikipedia and Commons which can provide freedoms similar to the GFDL, but without some of its requirements.

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Thanks! --Sfan00 IMG (talk) 14:50, 5 November 2008 (UTC)[reply]

d=diameter

h=height of triangle (equilateral)

8/sin(60)=diameter of circle

(d/4)*3=h

h*4=circumference of circle

pi=3

area of triangle=circumference of circle

radius divided height of triangle=0.666666.........

2/3=0.66666666........

kind of triangle that fits around the pupil of the eye!!! —Preceding unsigned comment added by 74.198.10.74 (talk) 13:02, 10 September 2009 (UTC)[reply]

180______pi(radical12)

sin60______1/sin60

3/4________4/3

sin1_______1/sin1

180_______pi

sin of 1 *180=pi

1degree=pi/180 mathematical constant of degree.

Twentythreethousand (talk) 16:07, 20 November 2009 (UTC)[reply]

Magnetic fields. the force is zero if the line is not perpendicular and the force of the lines is at the maximum when the line is perpendicular to the magnetic fields.(tv magnetic fields)four and three. 1<--->0, 90<--->infinity

2/sin 1

3/sin 1

4/sin 1

5/sin 1...

(90/sin 1 - 89/sin 1) similarities

sin0<--->sin90 0 to 90 degree

cos90<--->cos0 90 degree to 0

we are perpendicular to the sky(gravity)which is a force. 17:34, 25 December 2009 (UTC)Twentythreethousand (talk) base and sides.

Sides of polygons inscribed in a circle.

60 degree Sides of polygons 3 sides=30/radical12

30 degree Sides of polygons 6 sides=5*6=30

15 degree polygons 12 sides.

7.5 degree polygons 24 sides

96 sides for every power of two

${\displaystyle \sin(60/2^{x})*2^{x}*3.}$

for polygons and circles→sin(60÷2^x)×2^x×3←

• File:Pioriginal.gif

Twentythreethousand (talk) 18:56, 9 January 2010 (UTC)[reply]

5^2-2^2=21

                                   :(2/5)^2+((sqrt 21)/5)^2=1
                                   :x^2+y^2=1
                                   :asin (sqrt x)+ asin(sqrt y)=1
                                   :(sin60*sin60*sin30)^2+(sin30*sin30*sin60)^2=
                                    = (sin60*sin30)^2
                                   :(7*10*7)+(7*10*10)+(7*10)=1260
                                   : (sqrt 0.3)^2+(sqrt 0.7)^2=1
                                   :asin(sqrt 0.3)+asin(sqrt 0.7)=90

Theoreme de pythagore.

                                                     The relation between a circle and a triangle.

pi=sqrt(((sin x) /2)^2+((sin x/2)^2^2))*(180/(0.5*x)) f(x)=sqrt(((sin x) /2)^2+((sin x/2)^2^2))

(1/9)*pi=2rad, (2/9)*pi=4rad, (3/9)*pi=6rad, (4/9)*pi=8rad, (5/9)*pi=10rad (6/9)*pi=12rad, (7/9)=14rad.

atan(pi)=x degree-------sin x degree=y-----------1-y^2=z------------sqrt z=g-------asin g=90-x degree .sin 89*sin 1= sin 2/ 2 sin 88*sin 2= sin 4/ 2 sin 87*sin 3= sin 6/ 2 sin 86*sin 4= sin 8/ 2 sin 85*sin 5= sin 10/2 .............................etc standard function:f(x)= parametric function:x(t)=______________y(t)= polar function:r(t)=Twentythreethousand (talk) 18:29, 17 December 2010 (UTC)[reply]

sin 18=1÷(1+sqrt 5) and in radian asin (1÷(1+sqrt 5))=π÷10

z=(1÷(1+sqrt 5))

84×11=924 210×11=2310

The hand=14 the triangle of the hand=5^2-2^2=21 5×14=70 5×5=25 70-25=45

21-4=17 0.84-0.16=0.68 sqrt21÷5=sqrt0.84 2÷5=0.4

The use of infinite series:

(1÷14)-(1÷15)=(1÷210) 14×15=210 15-14=1 1÷15^1+1÷15^2+1÷15^3+1÷15^4.....=(1÷(15-1))

(sin x)^2+(cos x)^2=1

((sin x)^2×cos x)^2+((cos x)^2×sin x)^2=(cos x × sin x)^2

(sin 60)^2+(sin 30)^2=1

(sin 60×sin 60×sin 30)^2+(sin 30×sin 30×sin 60)^2=(sin 60×sin 30)^2

(sin x × sin x × cos x)^2+(cos x × cos x × sin x)^2=(sin x × cos x)^2

perimeter=(sin 60×sin 60×sin 30)^2+(sin 30×sin 30×sin 60)^2+(sin 60×sin 30)^2=>perimeter of right :triangle with three sides.

0.8+0.2=1

0.8×0.8×0.2+0.2×0.2×0.8=0.8×0.2

0.7+0.3=1

0.7×0.7×0.3+0.7×0,3×0.3=0.7×0.3

7×10×10+7×10×7+7×10=1260

7 days 7 nights=180*7=1260 degrees

measurements of angles:

sin 89×sin 1= sin 2÷ 2

sin 88×sin 2= sin 4÷ 2

sin 87×sin 3= sin 6÷ 2

sin 86×sin 4= sin 8÷ 2

sin 85×sin 5= sin 10÷2

sin 84×sin 6= sin 12÷2

sin 83×sin 7= sin 14÷2

sin 82×sin 8= sin 16÷2

sin 81×sin 9= sin 18÷2

sin 80×sin 10=sin 20÷2

sin 79×sin 11=sin 22÷2

sin 78×sin 12=sin 24÷2

sin 77×sin 13=sin 26÷2

sin 76×sin 14=sin 28÷2

sin 75×sin 15=sin 30÷2

sin 74×sin 16=sin 32÷2

sin 73×sin 17=sin 34÷2

sin 72×sin 18=sin 36÷2

..........etc

The use of digits are applied in many measurements of different elements.Measurements in lenght,area,volume,weight,energy,temperature,time,speed,geometry,astronomy,food,computers.

To find the lenght of a distance we have devices for measurement or some kind of tools that we need. We need first the number called :zero to begin the measurement.Note that zero in measurement is the first number or something that is empty.

To find the area of certain geometry based calculation we start to use angles: triangles to polygons to circles.Note again that in geometry a circle is a measurement of time and we use angles to measure distances. The circle or a sphere, which is the sum of three angles of triangles measuring to 180 degree( the lenght of a circle without using radian), and if we use radian mode the lenght would be the perimeter π or one radian times 180.

circumference= 2×r×π = d×π replacing π by 180=> 2×r×180 or = d×180

area =(π×r^2) =(1÷4×π×d^2) or =(45×(π÷180)×d^2) instead of pi, 180 or=(180×r^2)

volume =(4÷3×π×r^3) or =(1÷6×π×d^3) or =(30×(π÷180)×d^3) instead of pi, 180 or=(4÷3×180×r^3)

Because of a constant, the use of 0.5 as a radius and 1 as the diameter , the area of a circle has a surface of 45 m square using a :measurement of 180 degree and if it was pi(180×1rad), it would be 45 radian multiplied by diameter square which in this case the diameter exist or doesn't exist because it's one.And for the volume of a sphere the constant would be 30 cube or 30 radian cube multiplied by diameter exponentiel 3.

Replacing pi, the volume and the area and the circumference by 180, the equation is the same as in radian to degrees.When we calculate those two ,degrees and radians, the circle's lenght,volume and area have a relative changes.

The circle from the origine has an angle of 360 but it does have a lenght of 180 degrees or π in radian or the sum of three angles of a :triangle.

Pythagoreans used triangles to calculate angles or the sides of the triangle's lenght,from the opposite side to the adjacent.Angles whose sum are 180 and in radian π.

(sin x)^2+(cos x)^2=1,((sin x)^2*cos x)^2+((cos x)^2*sin x)^2=(sin x * cos x)^2. 1,3.5.7.9,11......,2.4.6.8.10 etc....measurement of angles and lenght in trigonometric functions.

How could one relate to the other?How could the sum of an angle be small and great .The inverse of a small number is infinity and the :inverse of infinity is the smallest of all small.How could one think of a zero when there are infinity numbers which we can't count.Is :it a paradox?Or Zero must have more than one definition when used with real numbers!

Geometry is one tool we have, as means of a picture, to calculate the area,the volume of three dimensions and perimeter of one given polygons of different shapes of objects.Whether it is in two dimensions or three or many dimensions, two dimensions shapes are chosen because it's the only way we can use a paper to draw two dimensions objects.And the circle, on a graph paper makes an angle of 45 degree :if we draw sin of x and cos of x or tangeant of x and use the inverse arcsin or others trigonometric functions.

From gradian to degree to radian.

sin 18=1÷(1+sqrt 5) and in radian asin (1÷(1+sqrt 5))=pi÷10

200g÷180=1.1111111111111111111

200g÷π--->63.639610306789277196075992589454.......

1÷(200g÷π)--->π÷200g (1÷0.9×sqrt{8})÷4--->π÷4

(1÷0.9×sqrt{8})÷10=0.31426968052735445528926416093549........

in radian: sin[(1÷0.9×sqrt{8})÷10]=0.30912200355642325046997898635547...

i:n degree:180.06326323142121391103983820135....

200g÷180.06326323142121391103983820135...=(π÷sqrt{8})

sin(x) = x - x^3÷3! + x^5÷5! - x^7÷7!..................................

the sine and cosine, the inverse trigonometric functions can be described in terms of infinite series.

hypotenuse--->sqrt{(45^2+45^2)} in degree

hypotenuse--->sqrt{(((1÷0.9×sqrt{8})÷4)^2+((1÷0.9×sqrt{8})÷4)^2)} in radian if true.
hypotenuse--->sqrt{(pi÷4)^2+(pi÷4)^2)} in radian

The use of fractions.

Take any rational or irrational numbers under 180,divide those numbers by 180 and take the sine of those digits in radian mode or by the use of taylor series.Inverte the sine in degree mode and divide the numbers that were divided by 180 using the answers that were given by taylor series or in radian mode reverted to degree mode, and you obtain pi.

Either you see numbers in a straight motion or line, or in a parabola form or like a zig zag it is a fact that digits or repunit and :polyonmial terms with an increasing dimensions, have a way of placing themselves in a triangular forms at 45 degree of an angle.Pascal's :triangle is one of them for polynomials terms.Of course base 10,100,1000,multiple of 10 or vise versa, have to be included to see the :real digits, with 0 as a space when numbers don't share between themselves; a repunit is a perfect example:

ex:100010001^3=1000300060007000600030001 ,triangular digits. lenght of the digits or terms are odd numbers followed from by exponent and it's has a pattern of a triangle.

        1000300060010001500180019001800150010000600030001

1000300060010001500210025002700270025002100150010000600030001

sin 18=1÷(1+sqrt 5) and in radian asin (1÷(1+sqrt 5))=pi÷10

A circle with a diameter of 1 or a multiple of ten or hundred etc... or vice versa with division, π is always the same.If it is a sphere with big size or small and the diameter of the sphere does not change and is one, it's always pi.Let's say we place an equillatteral triangle and the triangle multiplied by two as to form many polygons with a diameter of one within the circle,what would the lenght of :the sides of the polygons be?sin 60,sin 30,sin 15,sin 7.5,sin 3.75(180/60=3,180/30=6,180/15=12,180/7.5=24) etc... The Pythagoreans theorem is used to find the lengths of the sides of the polygons or the hypotenuse and the adjacent side, as well the opposite side.And :if it is a square(losange),a Perimeter of radical 8, in the circle of one diameter, the same method would apply.

ex:the measure of trigonometric function using geometry.

pi=sqrt(((sin x) ÷2)^2+((sin( x÷2)^2^2)))×(180÷(x)*2)

→sin(60÷2^x)×2^x×3←triangle

→sin(45÷2^x)×2^x×4←square(losange)

A magnet(magnetic field)and electricity which is (an electric field) with both having a similar properties concerning additive colors :and substractive colors (the composition of cells or electromagnet in the human body), a magnet that has three colors in a magnetic :field tested with a television or computer screen.One color has to be selected in the screen without combining different colors in the :screen and the magnetic field is seen as having a property of three colors.

Nine which is half of eighteen has another nine on the magnetic field and the attraction of both field would make an object rotate between the two fields as it is repulsing and attracting the unique kind of element with different properties.

When someone goes to a movie theater and watches a movie, the projector rotates the film, a film that has many pictures, frame by frame, and being rolled by the device. In rotating the film and passing light through the film, an optical illusion is produced making the pictures that are moving seem to be real, and magic is created.

triangular number:1,3,5,7,9,11,.....etc. odd numbers

                          2,4,6,8,10,12   etc.even numbers

Angles and lenghts of triangles. (sin 60)^2+(sin 30)^2=1 (sin 60×sin 60×sin 30)^2+(sin 30×sin 30×sin 60)^2=(sin 60×sin 30)^2 perimeter=(sin 60×sin 60×sin 30)+(sin 30×sin 30×sin 60)+(sin 60×sin 30)=>perimeter of right triangle with three sides. Observing the pattern of numbers:

1<:::::::::>9 2<::::::::>8 3<::::::::>7 4<::::::::>6 5<::::::::>5

1÷99999999.....9=

1÷99999999.....8=

1÷99999999.....7=

1÷99999999.....6=

1÷99999999.....5=

1÷99999999.....4=

1÷99999999.....3=

1÷99999999.....2=

1÷99999999.....1=

Trigonometry the use of pythagorean theory.

(sin x)^2+(cos x)^2=1 x+y=1 X×X×Y+X×Y×Y=X×Y only if the variables are under 1 and and their sum equals 1:

                                                                            Time.

The human hand.

                                   :5^2-2^2=21
                                   :(2÷5)^2+((sqrt 21)÷5)^2=1
                                   :(5-2)*(5+2)=21.....sqrt21
                                   :(5-3)*(5+3)=16.....sqrt16
                                   :x^2+y^2=1
                                   :asin (sqrt x)+ asin(sqrt y)=90
                                   :(sin60×sin60×sin30)^2+(sin30×sin30×sin60)^2=
                                    = (sin60×sin30)^2
                                   :(7×10×7)+(7×10×10)+(7×10)=1260
                                   :5+2=7
                                   :5*2*2+5*5*2+=7*5*2
                                   :5*5*2*2*2+5*5*5*2*2=7*5*2*5*2
                                   :5-2=3
                                   :5*5*2-5*2*2=3*5*2
                                   :5*5*5*2*2-2*2*2*5*5=3*5*2*5*2
                                   : (sqrt 0.3)^2+(sqrt 0.7)^2=1
                                   :asin(sqrt 0.3)+asin(sqrt 0.7)=90
                                   :21-4=17 and 0.84-0.16=0.68

0.09+0.16+0.21+O.24=0.7

0.1×0.9×0.9+0.1×0.1×0.9=0.09 0.1×0.9×0.9-0.1×0.1×0.9=0.072

0.2×0.8×0.8+0.2×0.2×0.8=0.16 0.2×0.8×0.8-0.2×0.2×0.8=0.096

0.3×0.7×0.7+0.3×0.3×0.7=0.21 0.3×0.7×0.7-0.3×0.3×0.7=0.084

0.4×0.6×0.6+0.4×0.4×0.6=0.24 0.4×0.6×0.6-0.4×0.4×0.6=0.048

0.5×0.5×0.5+0.5×0.5×0.5=0.25 0.5×0.5×0.5-0.5×0.5×0.5=0

0.6×0.6×0.4+0.4×0.4×0.6=0.24 0.6×0.6×0.4-0.4×0.4×0.6=0.048

0.7×0.7×0.3+0.3×0.3×0.7=0.21 0.7×0.7×0.3-0.3×0.3×0.7=0.084

0.8×0.8×0,2+0.2×0.2×0.8=0.16 0.8×0.8×0,2-0.2×0.2×0.8=0.096

0.9×0.9×0.1+0.1×0.2×0.9=0.09 0.9×0.9×0.1-0.1×0.2×0.9=0.072

0.10×0.10×0.90+0.90×0.90×0.10=0.09

0.11×0.11×0.89+0.89×0.89×0.11=0.0979

0.12×0.12×0.88+0.88×0.88×0.12=0.1056

0.13×0.13×0.87+0.87×0.87×0.13=0.1131

0.14×0.14×0.86+0.86×0.86×0.14=0.1204

0.15×0.15×0.85+0.85×0.85×0.15=0.1275

0.16×0.16×0.84+0.84×0.84×0.16=0.1344

0.17×0.17×0.83+0.83×0.83×0.17=0.1411

0.18×0.18×0.82+0.82×0.82×0.18=0.1476

0.19×0.19×0.81+0.81×0.81×0.19=0.1539

0.20×0.20×0.80+0.80×0.80×0.20=0.16

0.21×0.21×0.79+0.79×0.79×0.21=0.1659

0.22×0.22×0.78+0.78×0.78×0.22=0.1716

0.23×0.23×0.77+0.77×0.77×0.23=0.1771

0.24×0.24×0.76+0.76×0.76×0.24=0.1824

0.25×0.25×0.75+0.75×0.75×0.25=0.1875

0.26×0.26×0.74+0.74×0.74×0.26=0.1924

0.27×0.27×0.73+0.73×0.73×0.27=0.1971

0.28×0.28×0.72+0.72×0.72×0.28=0.2016

0.29×0.29×0.71+0.71×0.71×0.29=0.2059

0.30×0.30×0.70+0.70×0.70×0.30=0.21

0.31×0.31×0.69+0.69×0.69×0.31=0.2139

0.32×0.32×0.68+0.68×0.68×0.32=0.2176

0.33×0.33×0.67+0.67×0.67×0.33=0.2211

0.34××+××

0.35××+××

0.36××+××

0.37××+××

0.38××+××

0.39××+××

0.40××+××

0.41××+××

0.42××+××

0.43××+××

0.44××+××

0.45××+××

0.46××+××

0.47××+××

degree and radian.

sqrt 0.7=0.83666002653407554797817202578519

arcsin(sqrt 0.7)=0.99115658643119231930802979462854

pi/(arcsin(sqrt 0.7)=3.1696229401063336843793690455637

180/(pi/(arcsin(sqrt 0.7)))=56.789089239100915552011249709895

sin(180/(pi/(arcsin(sqrt 0.7)))=sqrt 0.7

(1/(1+sqrt 5))=0.30901699437494742410229341718282......

arcsin(1/(1+sqrt 5))=0.314159265358....

pi/(arcsin(1/(1+sqrt 5)))=10

180/(pi/(arcsin(1/(1+sqrt 5))))=18

sin(180/(pi/(arcsin(1/(1+sqrt 5)))))=(1/(1+sqrt 5))

180/40=4.5

Pi/(180/40)=0.69813170079773183076947630739545

Sin(pi/(180/40))=0.64278760968653932632264340990726

Asin(sin(pi/(180/40)))=40

f(x)=180/(pi/(asin(sqrt x))) radian mode.

f(x)=asin(sin(pi/(180/x)))

the use of infinite series to obtain the inverse of a trigonometric function selecting sin 30 or 0.5:

divided by 30, times 180 produces pi.

0.5+(1÷2)×(0.5^3÷3)+((1×3)÷(2×4))×(0.5^5÷5)+((1×3×5)÷(2×4×6))×(0.5^7÷7)+((1×3×5×7)÷(2×4×6×8))×(0.5^9÷9)+((1×3×5×7×9)÷(2×4×6×8×10))×(0.5^11÷11)+((1×3×5×7×9×11)÷(2×4×6×8×10×12))×(0.5^13÷13)+((1×3×5×7×9×11×13)÷(2×4×6×8×10×12×14))×(0.5^15÷15)+((1×3×5×7×9×11×13×15)÷(2×4×6×8×10×12×14×16))×(0.5^17÷17)+((1×3×5×7×9×11×13×15×17)÷(2×4×6×8×10×12×14×16×18))×(0.5^19÷19)....................

x+(1/2)*(x^3/3)+((1*3)/(2*4))*(x^5/5)+((1*3*5)/(2*4*6))*(x^7/7)+((1*3*5*7)/(2*4*6*8))*(x^9/9)+((1*3*5*7*9)/(2*4*6*8*10))*(x^11/11)+((1*3*5*7*9*11)/(2*4*6*8*10*12))*(x^13/13)+((1*3*5*7*9*11*13)/(2*4*6*8*10*12*14))*(x^15/15)+((1*3*5*7*9*11*13*15)/(2*4*6*8*10*12*14*16))*(x^17/17)+((1*3*5*7*9*11*13*15*17)/(2*4*6*8*10*12*14*16*18))*(x^19/19)........................

x=sin(10/9*sqrt8/10) in radian

1-(sin(10/9*sqrt8/10)^2)in radian=y

asin sqrt y in radian + x=pi/2

sqrt8=2.8284271247461900976033774484194

(pi-(pi/10)=2.8274333882308139146163790449516

(pi/10-pi/100)=0.28274333882308139146163790449516

(pi/100-pi/1000)=0.028274333882308139146163790449516

${\displaystyle 1+1/2!+1/3!+1/4!+1/5!+1/6!...\,}$

The sphere:

${\displaystyle x^{3}\,}$

30*1^3=30 30*2^3=240 30*3^3=810 30*4^3=1920 30*5^3=3750 ...............

 30         240      810      1920     3750     6480     10290
      210        570      1110      1830    2730     3810
            360       540        720      900       1080
                  180       180       180      180

3!*30

The area of a circle:

${\displaystyle x^{2}\,}$

45*1^2=45 45*2^2=180 45*3^2=405 45*4^2=720

 45       180         405          720
     135       225        315
          90        90

2!*45

A file that you uploaded or altered, File:Pioriginal.gif, has been listed at Wikipedia:Files for deletion. Please see the discussion to see why this is (you may have to search for the title of the image to find its entry), if you are interested in it not being deleted. Thank you. Incnis Mrsi (talk) 11:00, 17 May 2013 (UTC)[reply]

I don't know what you think you are doing here on this project, but contributions such as your recent posting here [1] strongly suggest you are not helping to build a rational, well-informed encyclopedia based on academic sources. I'm afraid I'm convinced it will be better if you do not attempt to edit this encyclopedia further, and I have therefore blocked you from editing. Fut.Perf. ☼ 17:44, 17 May 2013 (UTC)[reply]