# Trying to do linear algebra with pylab

I'm trying to do some basic linear algebra with pylab and visualize the results, specifically the transform y=Ax on a grid of points. I think I have it working but I am sure there are much better ways (much, much better) then what I have done. My code is below and any suggestions as to how to improve it, both on applying the transform to the grid and on plotting the results would be much appreciated. My code is below..........

``````from pylab import *
## Linear algebra
# y = Ax

A = array([[2, 1], [1.5, 2]]) # np array definition
x = array([[0.75], [0.25]])
y = dot(A,x)                  # matrix multiplication for np array

plot(x[0], x[1], 'ob', y[0], y[1], 'or')    # plot points
plot([x[0],y[0]],[x[1],y[1]])               # plot line
suptitle('The matrix A transforms the point (0.75, 0.25) to (1.75, 1.625)')
show()

figure()
p = [1,2,3,4,5]
q = [1,2,3,4,5]
m=meshgrid(p,q)        # Create grid for plotting
plot(m[0],m[1], 'ob')
for i in range(1,6): hlines(i, 1, 5)
for i in range(1,6): vlines(i, 1, 5)

# Apply transform to every point in grid.
ygrid = zeros(shape(m))
for i in range(5):
for j in range(5):
x = array([m[0][i][j], m[1][i][j]])
y = dot(A,x)
ygrid[0][i][j] = y[0]
ygrid[1][i][j] = y[1]
plot(x[0], x[1], 'ob', y[0], y[1], 'or')

suptitle('Using the transform y=Mx on a grid of points')
show()
``````

thanks, D

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Your question may be better suited for codereview.stackexchange.com. Otherwise, I don't think there's anything that really needs to be improved in the above code. Unless you have particular concerns (running out of memory, speed, breakage in special cases etc). –  Evert Sep 18 '12 at 9:59
thanks I'll try that –  Dave Sep 18 '12 at 13:28