# Matlab:output vector giving the x and y values of point of intersection

How do I write a function having 3 inputs (2 vectors consisting of coefficients[a b c] and vector of x values) of two line equations of form ax+by=c that outputs a vector giving x and y values of the point of intersection.

Example: solveSystem([1 -1 -1],[3 1 9],-5:5 ) should produce [2 3]

So far:

``````function coeff=fitPoly(mat)

% this function takes as an input an nx2 matrix consisting of the
% coordinates of n points in the xy-plane and give as an output the unique
% polynomial (of degree <= n-1) passing through those points.

[n,m]=size(mat);  % n=the number of rows=the number of points
% build the matrix C
if m~=2
fprintf('Error: incorrect input');
coeff=0;
else
C=mat(:,2);  % c is the vector of y-coordinates which is the 2nd column of mat

% build the matrix A
for i=1:n
for j=1:n
A(i,j)=(mat(i,1))^(n-j);
end
end
coeff=inv(A)*C;
end
``````
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ax+bx=c is not an equation of a line. Did you mean ax+bu=c? –  Kavka Dec 7 '11 at 6:05
sorry...meant ax+by=c –  George Griffin Dec 7 '11 at 11:42
Your question at the top and the code you posted are inconsistent. Are you looking for intersection of lines or a polynomial fit. You should clarify your question. –  Kavka Dec 7 '11 at 22:38
I wanted to use this for my input creating vectors. one for my x-values,y values and coefficients, –  George Griffin Dec 8 '11 at 6:01

You don't need the vector x to solve for the intersection of the two lines:

``````function xy = solve(c1,c2)
A = [c1(1:2); c2(1:2)];
b = [c1(3); c2(3)];
xy = A\b;
end
``````

which would compute for

``````xy = solve([1 -1 -1],[3 1 9])
``````

the matrices

``````A = [1 -1;
3 1]
b = [-1
9]
``````

so that

``````xy = A^-1 b = [2
3]
``````
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Extra +1 for use of `` operator. –  Nzbuu Dec 7 '11 at 14:31