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**New Theories / Alternate take on Fermats Last Theorem**

« **on:**01/01/2021 15:36:06 »

No offense to andrew Wiles and his very interesting but incomprehensible proof. and all those pure mathematicians who demand an exact solution when an infinitessimally close approximation will sufffice.

a^n+b^n=c^n

for any integers a,b,c and any n integer greater than 2. the theorem states that there are no solutions.

wiles proves this in his magnum opus and indeed there are no exact solutions.

look

2^5+3^5=3.07515165743^5

if we admit real solutions

then we can say that for some integer k, (10^k*a)^n+(10^k*b)^n=(10^k*c)^n where 10^k*c is truncated to k+1 digits and it becomes an integer

so we could write

2000000000^5+3000000000^5=3075151657^5

is accurate to 1 part in 10^9 which is accurate enough for most scientific calculations and engineering calculations

so if we are pragmatic, there is an infinite number of infinitessimally close solutions to Fermats last theorem for every n. k should be greater than about 6 to achieve an accuracy of 1 part per milliion.

best wishes and happy new year

Richard Belshaw

aka

Maeve Chondrally

a^n+b^n=c^n

for any integers a,b,c and any n integer greater than 2. the theorem states that there are no solutions.

wiles proves this in his magnum opus and indeed there are no exact solutions.

look

2^5+3^5=3.07515165743^5

if we admit real solutions

then we can say that for some integer k, (10^k*a)^n+(10^k*b)^n=(10^k*c)^n where 10^k*c is truncated to k+1 digits and it becomes an integer

so we could write

2000000000^5+3000000000^5=3075151657^5

is accurate to 1 part in 10^9 which is accurate enough for most scientific calculations and engineering calculations

so if we are pragmatic, there is an infinite number of infinitessimally close solutions to Fermats last theorem for every n. k should be greater than about 6 to achieve an accuracy of 1 part per milliion.

best wishes and happy new year

Richard Belshaw

aka

Maeve Chondrally

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