A non Homogeneous system of 3 equations in three unknowns AX=D has unique solution ,if

A non-Homogeneous system of 3 equations in three unknowns AX=D has no solution, if

A non-Homogeneous system of 3 equations in three unknowns AX=D has infinitely many solutions, if

A non homogeneous system of linear equations in three variables AX=D has unique solution if

A non homogeneous system is three equations in 3 unknowns Ax = D has a unique solution. If a)Rank of (A) = Rank of (AD) = 3 b)Rank of (A) != Rank of (AD) c)Rank of (A) = Rank of (AD) = 2 d)Rank of (A) is one

" A non-Homogeneous system of "3" ' equations in three unknowns "AX=D" has infinitely many solutions,if "

A homogenous system of 3 equation with 3 unknowns AX = 0 has Unique solutions (Trivial solutions x =y =z =0),if

A homogenous system of 3 equation with 3 unknowns AX=O has infinitely many solutions, if

A homogenous system of 3 equation with 3 unknowns AX=0 has infinitely many solutions, if

The system of equations AX=D has unique solution if

The system AX = B of n equation in n unknown has infinitely many solutions if