If `A=(a_(ij))_(mxxn),B=(b_(ij))_(nxxp)andC=(c_(ij))_(pxxq)`,
then the product (BC) A is possible only when

. Identify the products B and C and write their formulae.

If A = [a_(ij)]_(nxxn) and a_(ij) = (i^(2) + j^(2) - ij) (j - i) .n is odd, then which of the following is not the value of Tr(A) ? a)0 b)|A| c)2|A| d)none of these

If Delta=|[a_(11), a_(12 ), a_(13)], [a_(21), a_(22), a_(23)],[ a_(31) , a_(32), a_(33)]| and A_(i j) is cofactors of a_(ij) , then value of Delta is given by i) a_(11) A_(31)+a_(12) A_(32)+a_(13) A_(33) ii) a_(11) A_(11)+a_(12) A_(21)+a_(13) A_(31) iii) a_(21) A_(11)+a_(22) A_(12)+a_(23) A_(13) iv) a_(11) A_(11)+a_(21) A_(21)+a_(31) A_(31)

If Delta_(1)|(a_(1)^(2)+b_(1)+c_(1),a_(1)a_(2)+b_(2)+c_(2),a_(1)a_(3)+b_(3)+c_(3)),(b_(1)b_(2)+c_(1),b_(2)^(2)+c_(2),b_(2)b_(3)+c_(3)),(c_(3)c_(1),c_(3)c_(2),c_(3)^(2))|andDelta_(2)=|(a_(1),b_(1),c_(1)),(a_(2),b_(2),c_(2)),(a_(3),b_(3),c_(3))| then Delta_(1) // Delta_(2) is equal to a) a_(1)b_(2)c_(3) b) a_(1)a_(2)a_(3) c) a_(3)b_(2)c_(1) d) a_(1)b_(1)c_(1) +a_(2)b_(2)c_(2)+a_(3)b_(3)c_(3)

If x_(i) = a_(i)b_(i)c_(i)= I = 1,2,3 are three - digit positive integers such that each x_(i) is a multiple of 19, then for some interger n, prove that |(a_(1),a_(2),a_(3)),(b_(1),b_(2),b_(3)),(c_(1),c_(2),c_(3))| is divisible by 19.

Three distinct A.P. s' have same first term common differences as d_(1) ,d_(2) ,d_(3) and n^(th) terms as a_(n) , b_(n) ,c_(n) respectively such that (a_(1))/(d_(1))=(2b_(1))/(d_(2))=(3c_(1))/(d_(3)). If (a_(7))/(c_(6))=(3)/(7) then find the value of (b_(7))/(c_(6)) .

If z=|(1+ax,1+bx,1+cx),(1+a_(1)x,1+b_(1)x,1+c_(1)x),(1+a_(2)x,1+b_(2)x,1+c_(2)x)|=A_(0)+A_(1)x+A_(2)x^(2)+A_(3)x^(3) , then A_(0) is equal to

Consider a 2xx2 matrix A=[a_(ij)] , where a_(ij)=(i+j)^2/2 . Write the transpose of A .