I have plenty of counter examples with INTEGERS only

Let us see how simple it is, and for simplicity, I would like to repeat it in decimal 10base number system, and once you get it, please teach and educate your teachers about it before you would certainly get brain washed and become as ignorant and a victim of old corrupted fake unnecessary mathematics

ONE Example of Old claim of mine, the famous number representing the arithmetical cube root of two does not exist, denoted by (2^(1/3)), or ($\sqrt[3]{2}$)

The proof:

I had introduced this general self proved Diophantine equation

IFF: (D(n))^p + K(n) = q*s^{n*p} < (D(n) + 1)^p

where (p, q) are prime numbers, (n) is non negative integer, (s > 1) is positive integer, then this Diophantine equation implies that D(n) is positive integer that must represent the approximation of the arithmetical p’th root of q, with (n) number of accurate digits in (s) base number system, denoted by (q^(1/p)), or ($\sqrt[p]{q}$), K(n) is therefore positive integer

In our chosen case here for (2^(1/3)), we have (s = 10), p = 3, q = 2, so our Diophantine equation :

(D(n))^3 + K(n) = 2*(10)^{3n} < (D(n) + 1)^3

Now, we assume varying integer for (n = 0, 1, 2, 3, …, n), and we then, can easily observe how indefinitely K(n) goes as we increase (n)

For (n = 0), D(0) = 1, K(0) = 1, showing the first approximation with zero digit after the decimal notation

For (n = 1), D(1) = 12, K(1) = 272, showing the second approximation with one digit after the decimal notation
For (n = 2), D(2) = 125, k(2) = 46875, showing the THIRD approximation with TWO digits after the decimal notation

For (n = 3), D(3) = 1259, K(3) = 4383021, showing the FOURTH approximation with THREE digits after the decimal notation

For (n = 4), D(4) = 12599, K(n) = 100242201, showing the fifth approximation with four digits after the decimal notation

……… ……………….. ……………………… ………………….

For (n = 10), D(10) = 12599210498, K(n) = 451805284631045974008, showing the eleventh approximation with 10 digits after the decimal notation

Now, can you imagine how large the existing term integer K(n) would be for large (n)?
Or do you think that K(n) would become zero at infinity?, of course never, it would grow indefinitely with (n) to the alleged infinity

Numbers are themselves talking the truth, and who is on earth that can face numbers with perpetual denial, even the proofers of the most famous theorems could not get it yet, WONDER!
“NO NUMBER EXISTS WITH ENDLESS TERMS”

This is really the true absolute meaning of the truthiness of Fermat’s last theorem!

But what do the top professional mathematics do exactly, they simply consider (K(n) = zero), in order to justify the ILLEGAL real number (2^(1/3)), so they set K(n) = 0, then obviously our exact Diophantine equation is foraged to becomes as this

(D(n))^3 = 2*(10)^{3n}, take cube root of both sides then you get

D(n)/10^n = 2^(1/3), when (n) tends to infinity, where even this expression is not permissible in the holy grail principles of mathematics , since you would have a ratio of two integers where each of them is with infinite sequence of digits

So, happy real fake numbers at the fake paradise of all the top mathematicians on earth

It is also understood that those roots for (p > 2), are proved rigorously as impossible constructions in order to justify them or accept them as real existing numbers, and all the alleged claimed constructions are only mere cheating (if you investigate carefully into them)

But it is well understood for practical needs as that if we want to make a cube that contains two unit cubes for instance, then this is not at all difficult even for a carpenter, we can use those approximation as much as we do like, (this is actually not mathematics works, but application works)

So, the hope is held now on the clever school students mainly, whom they would understand those fiction numbers so easily, and certainly they would remove this long standing shame upon themselves and upon mathematics


Regards
Bassam King Karzeddin
27/02/17