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Sep 21 2009 03:29am
Quote (MW_Dream @ Mon, Sep 21 2009, 05:29am)
Killing Homo's

:rifle: :kiss: :hug:


Not very nice
+41
Member
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Sep 21 2009 03:29am
Quote (MW_Dream @ Mon, Sep 21 2009, 04:29am)
Killing Homo's

:rifle: :kiss: :hug:


+420
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Sep 21 2009 03:30am
Quote (JoKa @ Mon, Sep 21 2009, 05:29am)
+420


Lol
+43
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Sep 21 2009 03:31am
Quote (Monkeboy @ Mon, Sep 21 2009, 05:30am)
Lol
+43


+44
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Sep 21 2009 03:31am
Quote (Monkeboy @ Mon, Sep 21 2009, 05:31am)
+44


+45
Comeon Keep Up Lol
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Sep 21 2009 03:32am
+pi

3.1415926535897932384626433832795028841971693993751
05820974944592307816406286208998628034825342117067
98214808651328230664709384460955058223172535940812
84811174502841027019385211055596446229489549303819
64428810975665933446128475648233786783165271201909
14564856692346034861045432664821339360726024914127
37245870066063155881748815209209628292540917153643
67892590360011330530548820466521384146951941511609
43305727036575959195309218611738193261179310511854
80744623799627495673518857527248912279381830119491
Member
Posts: 7,144
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Sep 21 2009 03:33am
Quote (MW_Dream @ Mon, Sep 21 2009, 05:32am)
+pi

3.1415926535897932384626433832795028841971693993751
05820974944592307816406286208998628034825342117067
98214808651328230664709384460955058223172535940812
84811174502841027019385211055596446229489549303819
64428810975665933446128475648233786783165271201909
14564856692346034861045432664821339360726024914127
37245870066063155881748815209209628292540917153643
67892590360011330530548820466521384146951941511609
43305727036575959195309218611738193261179310511854
80744623799627495673518857527248912279381830119491


∞ > all
+47

This post was edited by Monkeboy on Sep 21 2009 03:33am
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Sep 21 2009 03:33am
Quote (Monkeboy @ Mon, Sep 21 2009, 03:33am)
∞ > all
+47


A New Approach to the Universal Constant "pi"

Attached you will find an original, I would like to believe, research study, concerning «A new approach to the area of a circle» and thus a new approach to the Universal Constant "pi".

The innovative aspect of the new approach is attributed to avoid the insurmountable

obstacles presented by the intervention of square roots and infinite series when we try to calculate the circumference as the

Upper Limit of the perimeter of a regular Polygon inscribed in the circle, according to the relevant "deceptive"

definition, i.e. sin15o = 1/4 {sqrt(6) - sqrt(2)}.

The New Theory considers the above way as an "impasse", which makes us to believe that the so derived number

pi' = 3.14159 2 6535.... is an irrational and trancendental number.

By the new way we approach the area of the circle as the "Lower Limit" of the area of the Superscribed Regular Polygon, coming from the square of side ao = 2R, and we use as main tool the "tangent", the values of which can be easily calculated, with the desirable accuracy, using as algorithm the formula

tan(2q) = 2tanq / {1-tanq} which defines the circle.

By this method we discover that it is impossible for the Lower Limit of the Superscribed Polygon, to be less than the

Limit 4 * 0.7854 = 3.1416.

More precisely the new method meets the Known number

3.14159 2 6535... and proves that in order to reach this number we have violated the sense of the circumference making the arbitrary assumption that: for very acute angles we can consider that

tanq = 1/2 tan(2q) instead of tanq < 1/2 tan(2q), according to the indisputable formula:

tan(2q) = 2tanq / {1-tanq} -> tanq < 1/2 tan(2q) always

and certainly 2sinq < 2arcq < 2tanq always.

However small the side-chord of the inscribed regular polygon, this chord is less than the respective arc and always there exists a minimum area between the chord and the arc, however great is the number N = 4 * 2n of the sides.

The above observation explains the irrational and trancendental character of the so defined circumference, and why "we can not see" the Upper Limit of an inscribed regular polygon.

On the contrary, through the New Theory, which dares the "transgretion", the lower Limit of the regular Superscribed polygon "is visible" and can not be other than 3.1416 R2 exactly.

Also, according to the New Theory, the area of the circle is the first real root of the algebraic equation:

X2 - 4X + 2.69674944 = 0, the second root of which is the 4k = m = 0.8584 R2 that is the area of the 4 equal curvilinear triangles, which lie between the circumference and the perimeter of the superscribed square of side ao = 2R, so that: ...
Member
Posts: 7,144
Joined: Jul 13 2007
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Sep 21 2009 03:33am
Quote (MW_Dream @ Mon, Sep 21 2009, 05:33am)
A New Approach to the Universal Constant "pi"

Attached you will find an original, I would like to believe, research study, concerning «A new approach to the area of a circle» and thus a new approach to the Universal Constant "pi".

The innovative aspect of the new approach is attributed to avoid the insurmountable

obstacles presented by the intervention of square roots and infinite series when we try to calculate the circumference as the

Upper Limit of the perimeter of a regular Polygon inscribed in the circle, according to the relevant "deceptive"

definition, i.e. sin15o = 1/4 {sqrt(6) - sqrt(2)}.

The New Theory considers the above way as an "impasse", which makes us to believe that the so derived number

pi' = 3.14159 2 6535.... is an irrational and trancendental number.

By the new way we approach the area of the circle as the "Lower Limit" of the area of the Superscribed Regular Polygon, coming from the square of side ao = 2R, and we use as main tool the "tangent", the values of which can be easily calculated, with the desirable accuracy, using as algorithm the formula

tan(2q) = 2tanq / {1-tanq} which defines the circle.

By this method we discover that it is impossible for the Lower Limit of the Superscribed Polygon, to be less than the

Limit 4 * 0.7854 = 3.1416.

More precisely the new method meets the Known number

3.14159 2 6535... and proves that in order to reach this number we have violated the sense of the circumference making the arbitrary assumption that: for very acute angles we can consider that

tanq = 1/2 tan(2q) instead of tanq < 1/2 tan(2q), according to the indisputable formula:

tan(2q) = 2tanq / {1-tanq} -> tanq < 1/2 tan(2q) always

and certainly 2sinq < 2arcq < 2tanq always.

However small the side-chord of the inscribed regular polygon, this chord is less than the respective arc and always there exists a minimum area between the chord and the arc, however great is the number N = 4 * 2n of the sides.

The above observation explains the irrational and trancendental character of the so defined circumference, and why "we can not see" the Upper Limit of an inscribed regular polygon.

On the contrary, through the New Theory, which dares the "transgretion", the lower Limit of the regular Superscribed polygon "is visible" and can not be other than 3.1416 R2 exactly.

Also, according to the New Theory, the area of the circle is the first real root of the algebraic equation:

X2 - 4X + 2.69674944 = 0, the second root of which is the 4k = m = 0.8584 R2 that is the area of the 4 equal curvilinear triangles, which lie between the circumference and the perimeter of the superscribed square of side ao = 2R, so that: ...


+49

This post was edited by Monkeboy on Sep 21 2009 03:34am
Member
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Sep 21 2009 03:34am
Quote (Monkeboy @ Mon, Sep 21 2009, 05:33am)
+49


+50
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