- #1
Math Amateur
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In the book by Keith Devlin on the Millenium Problems - in Chapter 6 on the Birch and Swinnerton-Dyer Conjecture we find the following text:
"It is a fairly straightforward piece of algebraic reasoning to show that there is a right triangle with rational sides having an area d if and only if the equation:
[itex] y^2 = x^3 - d^2 x [/itex]
has rational solutions for x and y with
(Note: Devlin has defined d as a positive whole number earlier on)
Can someone please supply the straightforward algebra to show that:
There is a right triangle with rational sides having an area d if and only if the equation:
[itex] y^2 = x^3 - d^2 x [/itex]
has rational solutions for x and y with [itex] y \ne 0 [/itex]"
Peter
"It is a fairly straightforward piece of algebraic reasoning to show that there is a right triangle with rational sides having an area d if and only if the equation:
[itex] y^2 = x^3 - d^2 x [/itex]
has rational solutions for x and y with
(Note: Devlin has defined d as a positive whole number earlier on)
Can someone please supply the straightforward algebra to show that:
There is a right triangle with rational sides having an area d if and only if the equation:
[itex] y^2 = x^3 - d^2 x [/itex]
has rational solutions for x and y with [itex] y \ne 0 [/itex]"
Peter