Suppose we have an old coordinate system using the variables $x$ and $y$. We are given two equations for lines to form the axis for new coordinates. e.g. The line $z=0$ is given by the equation $y = m_1 x + b_1$, and the line $w=0$ is given by the equation $y = m_2 x + b_2$. Now suppose we are given a point $(x_3, y_3)$. What are the $w$ and $z$ coordinates of this point?
How do I calculate a change of coordinates given two lines as new axis?
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0Have you seen [this](http://math.stackexchange.com/questions/62581)? – 2012-07-07
3 Answers
Let $\bf p$ be the intersection point of the lines, and let $\bf u$ and $\bf v$ be unit direction vectors associated to the two lines. The first part of the transformation should translate $\bf p$ to $\bf 0$; so wlog assume $\bf p=0$.
We want to write $\mathbf{x}=a\mathbf{u}+b\mathbf{v}$; to do this, form the matrix $\mathrm{U}=[\bf u~v]$ (we assume vectors are column vectors), so we can write $\mathbf{x}=\mathrm{U}[a~b]^T$ and hence we solve for $a,b$ via $[a~b]^T=\mathrm{U}^{-1}\bf x$. Then $\bf x$ in the old coordinates corresponds to $[a~b]^T$ in the new coordinates.
Two changes-of-coordinates of the sort we want are related by a third coordinate change taking place in the second coordinates. This new coordinate change preserves the origin and two axes, and therefore is precisely a rescaling of the $a$- and $b$-axes individually.
Let $P$ be the point $(x_3,y_3)$. Draw lines parallel to both $y=m_1x+b_1$ and $y=m_2x+b_2$ through $P$ and suppose those parallel lines meets $y=m_1x+b_1$ and $y=m_2x+b_2$ at $A$ and $B$ respectively. If $O$ is the intersection point of $y=m_1x+b_1$ and $y=m_2x+b_2$ then $(w,z)=(|OB|,|OA|)$
There is not enough information to convert coordinates. We are given the location of the axes, but not the coordinate scale on those axes. The $z$ and $w$ coordinates can be given by $ \begin{align} z&=c_1(\color{#C00000}{m_1x+b_1-y})\\ w&=c_2(\color{#C00000}{m_2x+b_2-y}) \end{align}\tag{1} $ for any $c_1,c_2\not=0$. Given the $(x,y)$ and $(z,w)$ for some point not on the $z$ or $w$ axes (so that we can divide by the red terms in $(1)$), we can compute $c_1$ and $c_2$, which determines the conversion $(1)$.