The angumented matrix of a system of linear equation is `[[1,3,-2,5],[0,1,2,-3],[0,0,lambda-2,mu+1]]` then system has no solution.

The augmented matrix of a system of linear equations is [(1,2,7,3),(0,1,4,6),(0,0,lambda-7,mu+5)] . The system has infinitely many solutions if

Let A be the set of all 3xx3 symmetric matrices all of whose either 0 or 1. Five of these entries are 1 and four of them are 0. The number of matrices A in A for which the system of linear equations A[(x),(y),(z)]=[(1),(0),(0)] has a unique solution is

The matrix A satisfying the equation [(1,3),(0,1)] A= [(1,1),(0,-1)] is

In vestigate the values of lambda and mu the system of linear equations 2x+3y+5z=9,7x+3y-5z=8, 2x+3y+ lambda z= mu , have (i) no solution (ii) a unique solution (iii) an infinite number of solutions.

The matrix is [(4,3,1),(0,2,3),(0,0,-2)] is:

Find the value of lambda for which the homogeneous system of equations: 2x+3y-2z=0 2x-y+3z=0 7x+lambday-z=0 has non-trivial solutions. Find the solution.