From the matrix equation AB=AC, we conclude B=C provided.

From the matrix equation AB = AC we can conclude B = C provided that

From the matrix equation AB=AC we can conclude that B=C provide (A) A is singular (B) A is non singular (C) A is symmetric (D) A is square

From the matrix equation AB = AC, which one of the following can be concluded ?

Give an example of three matrices A,B,C such that AB=AC but B!=C .

From the following V-T diagram we can conclude:-

If A,B and C are the square matrices of the same order and AB=AC implies B=C, then (A) A is singular (B) A is non-singular (C) A is symmetric (D) A may be any matrix B.

If A cap B = A cup B then what can we conclude ?

B and C are points on the circle x^(2)+y^(2)=a^(2) A point A(b,c) lies on that circle such that AB=AC=d, the equation to BC is