We attempt to obtain Pythagorean triples by a simple method
consisting in transforming the relation between integers 2 22 ) na(ba into an equation innby introduction of a parameter n /b . By this way we obtain easily Pythagorean triples for each choice
of . Following this example we introduce also a suitable parameter
totransform the relation m mm ) na(ba into an equation inn which
must have only one multiple root, i.e. must have coefficients alternated in
signs. Observing that this happens only for 2 ,1m and not
at all for 2 m , we arrive to conclude that the equation has roots only for 2
,1m and no root for 2 m thus prove the Fermat’s last theorem.
Author (s) Details
Dr. Do Tan Si
HoChiMinh-City Physical Association, Vietnam and ULB and UEM, Belgium.
View Book:- http://bp.bookpi.org/index.php/bpi/catalog/book/214
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