The cost of the kindle book
The book
My kindle library
It was necessary to get the kindle book. Because the atmosphere in township of RDCIS is more for hypergeometric functions than my hopes of becoming a comic artist. Another reason is #Pythashastri, 1,x,x squared, x cubed. . . model of mine which is close to hypergeometric distribution and functions.
I shall spread the expression of the type a^n by combination (bn,cn) summed up from 1 to infinity and allow to be banged by its equivalence to hypergeometric functions.
Hypergeometric functions are likely to be easy for me. Just like learning advanced calculus to an IITian.
Have a nice day !!
7 comments:
It seems to me
1. Wallis laid the theory of x. The ruler x.
2. Euler was a genius and made the basic hypergeometric function as we know today.
Gauss poked his sharp nose and introduced complex plane when all it was; was a 2d paper. The light bends. And there is magnetic field.
. . . then there is group theory, lie groups and more . . .
Gauss tried to take advantage of the fact that Euler hypergeometric function had a into b by c. He like an angry child questioned what will happen if c first becomes zero. He also advised methods on how to interpret Euler hypergeometric functions.
He stooped to very low levels. Gauss did.
He failed to understand that Euler hypergeometric function fetched classical results when a,b,c are given specific integer values.
Like a mad ox he advised complex functions for z. He had followers. Group theory then ensued.
The group as I see are of
1. The ruler x which led to Newton x between 0 and 1
2. If it is 1 then that can be 2 and the other can be 3 and so on variety.
3. Lie group and their variety ?
Gauss came up with astounding results with his complex arguments for hypergeometric functions.
Differential equations solutions too.
And more . . .
I shall be kindling with further chapters in my above book. Target 2023 end. By December 31.
Mathematicians and educationists realized that 0, 12, -17, 10/3 and others were because of algebra, number theory and geometry.
These are the major groups.
This finishes.
It could be that because hypergeometric functions lead to distributions, groups are intended.
My argument is augmented by the fact that Harishchandra talked of parabola which has a similar shape to distribution curve. He also was interested in Lie groups. Hence.
As we choose Wren and Martin over others, distribution in English language is what must be gauged.
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