Let $E\mathrm{/}K$ be an elliptic curve given by a Weierstrass model of the form:

$$y^2+a_{1}xy+a_{3}y=x^3+a_2{x}^2+a_{4}x+a_6$$

with $a_i\mathrm{\in }K$. Then:

1. 1.

   The only change of variables $(x,y)\mapsto (x^{\prime },y^{\prime })$ preserving the projective point $[0,1,0]$ and which also result in a Weierstrass equation, are of the form:

   $$x=u^2{x}^{\prime }+r,y=u^3{y}^{\prime }+s{u}^2{x}^{\prime }+t$$

   with $u,r,s,t\in K$ and $u\ne 0$.

2. 2.

   Any two Weierstrass equations for $E/K$ differ by a change of variables of the form given in $(1)$.

Let $E\mathrm{/}K$ be an elliptic curve and let

$$E_1:y^2+a_{1}xy+a_{3}y=x^3+a_2{x}^2+a_{4}x+a_6,E_2:y^{\prime 2}+a_1{x}^{\prime }{y}^{\prime }+a_3{y}^{\prime }=x^{\prime 3}+a_2{x}^{\prime 2}+a_4{x}^{\prime }+a_6$$

be two distinct Weierstrass models for $E\mathrm{/}K$. Then (by Prop. 1) there exists a change of variables $\mathrm{(}x\mathrm{,}y\mathrm{)}\mathrm{\mapsto }\mathrm{(}{x}^{\mathrm{\prime }}\mathrm{,}{y}^{\mathrm{\prime }}\mathrm{)}$ of the form:

$$x=u^2{x}^{\prime }+r,y=u^3{y}^{\prime }+s{u}^2{x}^{\prime }+t$$

with $u\mathrm{,}r\mathrm{,}s\mathrm{,}t\mathrm{\in }K$ and $u\mathrm{\ne }\mathrm{0}$. Moreover, $j\mathit{}\mathrm{(}{E}_{\mathrm{1}}\mathrm{)}\mathrm{=}j\mathit{}\mathrm{(}{E}_{\mathrm{2}}\mathrm{)}$, i.e. the $j$ invariants are equal ($j\mathit{}\mathrm{(}E\mathrm{)}$ is defined in http://planetmath.org/node/JInvariantthis entry) and $\mathrm{\Delta }\mathit{}\mathrm{(}{E}_{\mathrm{1}}\mathrm{)}\mathrm{=}{u}^{\mathrm{12}}\mathit{}\mathrm{\Delta }\mathit{}\mathrm{(}{E}_{\mathrm{2}}\mathrm{)}$, where $\mathrm{\Delta }\mathit{}\mathrm{(}{E}_i\mathrm{)}$ is the discriminant (as defined in http://planetmath.org/node/JInvarianthere).