# how to draw parallelogram with 2 points and slope

I have a start point(x0,y0), a end point(x2,y2) and a slope (of line between (x0,y0) and (x3,y3)) and i want to draw a parallelogram.

``````(x0,y0)       (x1,y1)
__________
\         \
\         \
\_________\
(x3,y3)      (x2,y2)
``````

Can somebody tell me how to do this? or suggest some algorithm or something.

Edit: Here y0 = y1 and y2 = y3

Regards

-
Does `y0 == y1` and `y3 == y2`? –  Daniel Gallagher Jan 20 '11 at 0:48
For future reference, you don't need to put `[SOLVED]` in the title. –  zzzzBov Jan 20 '11 at 3:59

If we denote the slope as `m` and suppose that `y0=y1` and `y3=y2`, then we can compute `x3` like so:

``````m = (y3 - y0) / (x3 - x0)
y3 = y2
m = (y2 - y0) / (x3 - x0)
m*x3 - m*x0 = y2 - y0
m*x3 = y2 - y0 + m*x0
x3 = (y2 - y0 + m*x0) / m
``````

And similarly:

``````m = (y2 - y1) / (x2 - x1)
y1 = y0
m = (y2 - y0) / (x2 - x1)
m*x2 - m*x1 = y2 - y0
-m*x1 = y2 - y0 - m*x2
x1 = -(y2 - y0 - m*x2) / m
``````
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hi thanks a lot for help. –  user427969 Jan 20 '11 at 3:30

You do not have enough data. With just two points and a slope you have an infinity of possible parallelograms (two points and a slope defines just two parallels, not a parallelogram).

From your drawing you seem to be looking for the parallelogram with horizontal borders, if so it gives you a second slope and you have y0 = y1 and y2 = y3.

You get x3 using the slop with:

``````x3 = ((y3-y0)/slope) + x0
``````

There is only x1 still unknown:

``````x1 = x0 + (x2-x3)
``````

Obviously I did not checked for all degenerating cases when you have no solution or infinite solutions. I leave that to someone else.

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hi thanks for replying –  user427969 Jan 20 '11 at 3:32

In general, if the sides of the parallelogram are not parallel to the axes:

The formulas for z0 and z1 are:

``````z0 = {  Cos[phi]^2 (X2 + (Y0 - Y2) Cot[theta]) +
Cos[phi] (Y0 - Y2 + (X0 - X2) Cot[theta]) Sin[phi] + X0 Sin[phi]^2,

Y0 Cos[phi]^2 +
Cos[phi] (X0 - X2 + (-Y0 + Y2) Cot[theta]) Sin[phi] +
(Y2 + (-X0 + X2) Cot[theta]) Sin[phi]^2
}

z1 = {  Csc[theta] (Cos[phi - theta] ((-Y0 + Y2) Cos[phi] + X2 Sin[phi]) -
X0 Cos[phi] Sin[phi - theta]),

Y2 Cos[phi]^2 +
Cos[phi] (-X0 + X2 + (Y0 - Y2) Cot[theta]) Sin[phi] +
(Y0 + (X0 - X2) Cot[theta]) Sin[phi]^2
}
``````
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Thanks a lot I may need this later on. Regards –  user427969 Jan 20 '11 at 3:33