Let P=[a(i j)] be a 3xx3 matrix and le...

Let `P=[a_(i j)]` be a `3xx3` matrix and let `Q=[b_(i j)],w h e r eb_(i j)=2^(i+j)a_(i j)for1lt=i ,jlt=3.` If the determinant of `P` is 2, then the determinant of the matrix `Q` is `2^(10)` b. `2^(11)` c. `2^(12)` d. `2^(13)`

Text Solution

AI Generated Solution

Similar Questions

Explore conceptually related problems

Let A=[a_(ij)] be a square matrix of order 3 and B=[b_(ij)] be a matrix such that b_(ij)=2^(i-j)a_(ij) for 1lei,jle3, AA i,j in N . If the determinant of A is same as its order, then the value of |(B^(T))^(-1)| is

If A=[a_(i j)] is a 2xx2 matrix such that a_(i j)=i+2j , write A .

Construct a matrix [a_(ij)]_(3xx3) ,where a_(ij)=(i-j)/(i+j).

Construct a 2xx3 matrix A=[a_(i j)] whose elements are given by a_(i j)=(i-j)/(i+j) .

Let A=[a_(ij)] and B=[b_(ij)] be two 4xx4 real matrices such that b_(ij)=(-2)^((i+j-2))a_(ji) where i,j=1,2,3,4. If A is scalar matrix of determinant value of 1/128 then determinant of B is

Construct a 3xx2 matrix A=[a_(i j)] whose elements are given by a_(i j)=e^(i x)sinj x

Construct a 3xx4 matrix A=[a_(i j)] whose elements a_(i j) are given by: ) a_(i j)=2i

Construct a 2xx3 matrix A=[a_(i j)] whose elements are given by a_(i j)=(1-j)/(1+i)

Construct a 3xx4 matrix A=[a_(i j)] whose elements are given by (i) a_(i j)=i+j (ii) a_(i j)=i-j

Construct a matrix [a_(ij)]_(3xx3) , where a_(ij)=2i-3j .

Let `P=[a_(i j)]` be a `3xx3` matrix and let `Q=[b_(i j)],w h e r eb_(i j)=2^(i+j)a_(i j)for1lt=i ,jlt=3.` If the determinant of `P` is 2, then the determinant of the matrix `Q` is `2^(10)` b. `2^(11)` c. `2^(12)` d. `2^(13)`

Text Solution

Similar Questions

Recommended Questions