Find the inverse of the matrix `A=[a b c(1+b c)/a]` and show that `a A^(-1)=(a^2+b c+1)I-a A` .

The inverse of a matrix A=[[a, b], [c, d]] is

" The inverse of the matrix "([1,0,0],[a,1,0],[b,c,1])" is "

Using elementary transformation, find the inverse of the matrix A=[(a,b),(c,((1+bc)/a))] .

If a, b and c are any three vectors and their inverse are a^(-1), b^(-1) and c^(-1) and [a b c]ne0 , then [a^(-1) b^(-1) c^(-1)] will be

if the roots of the equation a(b-c)x^(2)+b(c-a)x+c(a-b)=0 are equal then show that (2)/(b)=(1)/(a)+(1)/(c)

if the roots of the equation a(b-c)x^(2)+b(c-a)x+c(a-b)=0 are equal then show that (2)/(b)=(1)/(a)+(1)/(c)

If a=-10,b=1 and c=1 , Show that a -: (b+c) != (a -:b) + (a-:c)

If the roots of the equation a(b-c)x^(2)+b(c-a)x+c(a-b)=0 are equal,show that 2/b=1/a+1/c.

If for the matrix A ,\ A^3=I , then A^(-1)= A^2 (b) A^3 (c) A (d) none of these

Let A=[[1,1,2] , [-1,1,-1] , [1,-1,2]] B is the inverse matrix of A and C is the inverse matrix of B. If b_(ij) and c_(ij) are the general terms of B and C then the value of c_(12) b_(32) equals