= Particular Solution = A '''particular solution''' of a linear system is a point that satisfies the system. This is a vector of values notated as ''x,,p,,''. <> ---- == Description == A '''consistent''' linear system has either one or infinitely many solutions. Any one unique solution is called a particular solution. If a system has no solutions, it is '''inconsistent'''. === Number of solutions === If a consistent system has no free variables, there will be one unique solution. This can generalized in terms of [[LinearAlgebra/Rank|rank]]: a full column rank matrix has one unique solution. Conversely, if there is at least one free variable, there will be infinitely many solutions. One way to identify if a system is inconsistent is to compute the [[LinearAlgebra/Elimination#Simplification_with_Augmented_Matrices|reduced augmented matrix]]. If it has a pivot in the right-most column, then the system is inconsistent. ---- == Solutions == The idea of particular solution follows from basic algebra. * [[LinearAlgebra/ParticularSolution/2Equations2Unknowns|system of 2 equations, 2 unknowns, and one particular solution]] * [[LinearAlgebra/ParticularSolution/2Equations2Unknowns|system of 3 equations, 3 unknowns, and one particular solution]] Linear algebra introduces solution strategies such as [[LinearAlgebra/Elimination|elimination]] to find particular solutions in more complex systems. Reproducing the example from that page: {{{ x + 2y + z = 2 3x + 8y + z = 12 4y + z = 2 }}} This system is formulated as a matrix and eliminated into: {{{ ┌ ┐ ┌ ┐ ┌ ┐ │[1] 2 1 │ │ x│ │ 2│ │ 0 [2] -2 │ │ y│ = │ 6│ │ 0 0 [5]│ │ z│ │-10│ └ ┘ └ ┘ └ ┘ }}} This matrix has full column rank, so there is one unique solution: ''[2, 1, -2]''. This can be considered a particular solution. Considering instead a system with free variables: {{{ w + 2x + 2y + 2z = 1 2w + 4x + 6y + 8z = 5 3w + 6x + 8y + 10z = 6 }}} This system is formulated as a matrix and eliminated into: {{{ ┌ ┐ ┌ ┐ ┌ ┐ │[1] 2 2 2│ │ w│ │ 1│ │ 0 0 [2] 4│ │ x│ = │ 3│ │ 0 0 0 0│ │ y│ │ 0│ └ ┘ │ z│ └ ┘ └ ┘ }}} There are infinitely many solutions. To find one of them, try setting all free variables to 0 and solving the equations. {{{ 2y + 4z = 3 2y + 4(0) = 3 2y = 3 y = 3/2 w + 2x + 2y + 2z = 1 w + 2(0) + 2y + 2(0) = 1 w + 2y = 1 w + 2(3/2) = 1 w + 3 = 1 w = -2 }}} This reveals that a particular solution is ''[-2 0 3/2 0]''. ---- CategoryRicottone