Consider a linear system whose augmented matrix is first row (1 1 2 | 0) second row (1 2 -3 | -1) third row (9 19 k |-9) For what value of k will the system have no solutions ?

1 Answer
Sep 5, 2015

System has no solutions for #k=-32#

Explanation:

If we write the system in matrix form we get:

#[(1,1,2),(1,2,-3),(9,19,k)]*x=[(0),(-1),(-9)]#

The system has no solution if the determinant of the matrix is zero, so we look for such #k# for which:

#|(1,1,2),(1,2,3),(9,19,k)|=0#

#|(1,1,2),(1,2,-3),(9,19,k)|=2k-27+38-36+57-k=#

#=k+32#

The value of expression above is zero for #k=-32#

To calculate the determinant I used the Rule of Sarrus. It's described in Wikipedia under: https://en.wikipedia.org/wiki/Rule_of_Sarrus