# Solving an equation in Python [closed]

i'm trying to solve an equation but I don't know the way to do this. I've got a vector x wich is actually a matrix type and I would like to solve the equation x.transpose()*v=0 where v is another vector

Can someone help me?

-
Sorry my question was not really precise, I already know x and i would like to know the vector v! I know that there is a lot of possible solutions but how can i get one with the python programming language? –  Florian Aug 18 '11 at 1:21
What form is `x` in? Is it an array? A list? A `numpy` object? Something else? –  Alex Reynolds Aug 18 '11 at 1:24
Indeed. Some code, ANY code would be helpful in getting us pointed the right direction. Ideally, it'd be helpful to see your attempt at it so we know what direction you're headed. But at a minimum we need to see the code where you initialize x so we know what object types we're working with and the hand-worked answer for the simplest case you can manage so we can see what end product you're looking for. You can edit your question to add the code in so it's easy to find, there is a "code block" format button at the top so it will preserve your indentation and such as well. –  Jonathanb Aug 18 '11 at 1:38

## closed as not a real question by JBernardo, Alex Reynolds, Tim Post♦Aug 18 '11 at 12:09

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Take any vector at all and project it into the orthogonal complement of `x`.

``````Python 2.7.1 (r271:86882M, Nov 30 2010, 10:35:34)
[GCC 4.2.1 (Apple Inc. build 5664)] on darwin
>>> import numpy
>>> x = numpy.matrix([1, 3.14, 2.73]).T
>>> P = x * x.T / (x.T * x) # projector onto the space spanned by x
>>> Pperp = numpy.identity(3) - P # projector onto x's orthogonal complement
>>> Pperp * x
matrix([[  0.00000000e+00],
[  0.00000000e+00],
[ -2.22044605e-16]])
>>> y = numpy.matrix(numpy.ones((3,1)))
>>> yperp = Pperp * y
>>> yperp
matrix([[ 0.62484642],
[-0.17798225],
[-0.02416928]])
>>> x.T * yperp
matrix([[ -4.16333634e-16]])
``````

As written, this is quite unrestrained and gives a fairly arbitrary solution, but the same idea can be built up to find a set of basis vectors for all solutions.

-
`x.T*v` is another way of writing the dot product between vectors `x` and `v`, so it sounds like you want to find a vector `v` which is orthogonal to `x`. For the general case, there are infinitely many solutions (in 3 dimensions, imagine any vector `v` in the plane perpendicular to x).
``````v = 0