# Least Squares with two inequality constraints

I have a least square problem with two different inequality problems. i can not use NNLS because its just solve least square problem with equality and inequality problems or just one inequality constraint. can i use NNLS or any other algorithm or R package that i can solve this least square problem?

``````    min|| Ax-b||^2    x = c(c, d, f) is a vector
x >= 0
c + d * x + f * x >= 0
``````
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You can use the `quadprog` package (for general quadratic optimization problems) or `mgcv::pcls` (for constrained regression). – Vincent Zoonekynd May 25 '12 at 3:37
also `limSolve::lsei`. – flodel May 25 '12 at 4:21
Actually i have looked at limSolve package but i think i can not use it because my first contraint is x_{i}>= 0 and i can not write this condition as G matrix in lsei.is there any other way? – Bensor Beny May 27 '12 at 23:39
Yes, you can still use `limSolve::lsei`. The `x >= 0` constraint can be modeled as `Gx >= H` where `G` is the identity matrix and `H` is a vector of zeroes. – flodel Aug 10 '12 at 2:54
If you are still interested in an answer, you'll need to clarify some of the confusion in your problem formulation above. If `x` is your unknown variable, the statement that `x = c(c, d, f)` is a vector and the `c + d * x + f * x >= 0` don't make much sense to me. Maybe provide sample data as an example? – flodel Aug 10 '12 at 2:56