Find the condition that the system of equation `ax+by=c` and `lx+my=n` has a uniqe solution?

If am!=bl, then the system of equations ax+by=c,quad lx+my=n( a) has a unique solution (b) has no solution ( c) has infinitely many solutions (d) may or may not have a solution

Obtain the condition for the following system of linear equations to has a unique solution px + qy = r and lx + my = n .

If am= bl, then find whether the pair of linear equations ax + by= c and lx + my = n has no solution, unique solution or infinitely many solutions

Obtain the condition for the following system of linear equations to have a unique solution: ax+by=c,quad lx+my=n

Find the values(s) of k for which the system of equations kx-y=26x-2y=3 has ( i )a unique solution (ii) no solution.Is there a value of k for which the system has infinitely many solutions?

The system of equations ax-y- z=a-1 ,x-ay-z=a-1,x-y-az=a-1 has no solution if a is

Consider the system of equations ax +by=0cx+dy=0, where a,b,c,d in{0,1} )STATEMENT-1: The probability that the system of equations has a unique solution is 3/8 STATEMENT-2: The probability that the system of equations has a solution is 1

The system of equations ax-y-z=a-1,x-ay-z=a-1,x-y-az=a-1 has no solution,if a is