# How do I solve this specific type of linear systems?

I've been having trouble solving the system of linear equations in order to obtain X.

It looks like this;

``````A* ([4;0] + X*([4; 3] - [4;0])) = B
``````

Given `A = [-1 0; 0 -1; 1 1]` and `B = [0; 0; 5]`.

The solution im expecting is one that states that the largest X possible would be 1/3. In other words, X is a scalar which would satisfy the condition.

I would really appreciate any help!

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What answer do you get? What answer do you expect? Can you separate the code from the prose? AT <= B, so T = A\B is not valid matlab. –  munkhd Mar 12 at 16:10
Is "<=" less than or equal to or your attempt at an arrow? Please edit your question. Actual instances of `A` and `B` and your expected `T` (or `X`) would clarify things. –  horchler Mar 12 at 16:20
Is `([4;0] + X*([4; 3] - [4;0]))`? right? Doesn't that just simplify to `[4;3*X]`? –  nkjt Mar 12 at 16:40
Exactly that! But how would I do that in matlab? How would I find the largest value of X which satisfies the =B constraint? –  user3411554 Mar 12 at 16:48
As far as I can see, you can't get anything which is exactly = B, but you can find the maximum of `X` which keeps all of `A* ([4;0] + X*([4; 3] - [4;0]))` less than B - is that what you want? –  nkjt Mar 12 at 16:59

If you have the Symbolic Toolbox you can do something like:

``````A = [-1 0; 0 -1; 1 1];
B = [0;0;5];
syms X positive;

test = A*([4;0] + X*([4; 3] - [4;0]))-B;

solve(test<0,X);
``````

This will give you a range (0, 1/3) in which `test<0` is true. Or in this case you can just solve `test(3)==0` for the exact answer.

Otherwise, you can write a function which evaluates whether your conditions are met:

``````F = @(X)all(A*([4;0]+X*([4;3]-[4;0]))<B)
``````

Then write some code to manually evaluate F(X) for different X until you get within some threshold value of the max value of X.

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Unfortunately, I do not have access to that Toolbox. How would I make it such that it loops in an efficient manner, since X can take decimal values? –  user3411554 Mar 12 at 18:11
Usually you do something like start with a given range and a step (say 0 to 1 in 0.1 steps), find approximately where the crossover happens (e.g. 0.3 will work and 0.4 won't), and then examine that range in a smaller step (0.3 to 0.4 in 0.01 steps), and so on until your step value goes below some threshold you set. –  nkjt Mar 13 at 8:40