3. Find equations for a transformation $$ T $$ that maps a rectangular region $$ S $$ in the $$ u v $$-plane onto the region $$ R $$ consisting of the parallelogram with vertices $$ (0,0),(4,3),(2,4) $$, and $$ (-2,1) $$.

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Let $$ S $$ be the unit square in the $$ uv $$-plane, i.e.,
$$
0 \le u \le 1 \quad \text{and} \quad 0 \le v \le 1.
$$
We wish to find a linear transformation $$ T $$ that maps $$ S $$ onto the parallelogram $$ R $$ in the $$ xy $$-plane with vertices
$$
(0,0),\quad (4,3),\quad (2,4),\quad (-2,1).
$$

One convenient method is to identify one vertex of $$ R $$ as the image of $$ (0,0) $$ and use the two adjacent vertices to define the direction vectors. Here, we choose
$$
T(0,0) = (0,0),
$$
and select the vectors corresponding to the edges:
$$
\text{Edge 1: } (4,3) - (0,0) = (4,3),
$$
$$
\text{Edge 2: } (-2,1) - (0,0) = (-2,1).
$$
Then the transformation $$ T $$ is defined by
$$
T(u,v) = u(4,3) + v(-2,1).
$$

Writing this in coordinate form, we have
$$
x = 4u - 2v,
$$
$$
y = 3u + v.
$$

We can verify the mapping by checking the images of the vertices of $$ S $$:
- When $$ (u,v) = (0,0) $$: $$(x,y) = (0,0)$$.
- When $$ (u,v) = (1,0) $$: $$(x,y) = (4,3)$$.
- When $$ (u,v) = (0,1) $$: $$(x,y) = (-2,1)$$.
- When $$ (u,v) = (1,1) $$: $$(x,y) = (4-2,\, 3+1) = (2,4)$$.

Thus, the transformation $$ T $$ maps the unit square $$ S $$ onto the given parallelogram $$ R $$ correctly.
The transformation $$ T $$ that maps the unit square $$ S $$ in the $$ uv $$-plane onto the parallelogram $$ R $$ with vertices $$ (0,0) $$, $$ (4,3) $$, $$ (2,4) $$, and $$ (-2,1) $$ is defined by: $$ x = 4u - 2v, $$ $$ y = 3u + v. $$ This transformation ensures that the vertices of $$ S $$ are correctly mapped to the vertices of $$ R $$.

Find equations for a transformation that maps a rectangular region in the -plane
onto the region consisting of the parallelogram with vertices , and
.

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Find equations for a transformation that maps a rectangular region in the -plane onto the region consisting of the parallelogram with vertices , and .