Let P=[[1,0,0],[4,1,0],[16,4,1]]and I be...

Let `P=[[1,0,0],[4,1,0],[16,4,1]]`and `I` be the identity matrix of order `3`. If `Q = [q_()ij ]` is a matrix, such that `P^(50)-Q=I`, then `(q_(31)+q_(32))/q_(21)` equals

Similar Questions

Explore conceptually related problems

Let P=[[1,0,04,1,016,4,1]] and I be the identity matrix of order 3. If Q=[qij] is a matrix, such that P^(50)-Q=I, then (q_(31)+q_(32))/(q_(21)) equals

Let P = {:[(1,0,0),(4,1,0),(16,4,1)] and I be te identity matrix of order 3. If Q = [q_(ij)] is A matrix such that P(50)-Q=I is then q31+q32/q21. The value of

Let P=[(1,0,0),(3,1,0),(9,3,1)] and Q = [q_(ij)] be two 3xx3 matrices such that Q - P^(5) = I_(3) . Then (q_(21)+q_(31))/(q_(32)) is equal to

[[2,3,5],[4,1,2],[1,2,1]]=P+Q , where P is a symmetric matrix and Q is a skew symmetric matrix then Q=

If P=[(lambda,0),(7,1)] and Q=[(4,0),(-7,1)] such that P^(2)=Q , then P^(3) is equal to

Let A=[[0,2q,r] , [p,q,-r] , [p,-q,r]] If A A^T=I_3 then |p|=

Let `P=[[1,0,0],[4,1,0],[16,4,1]]`and `I` be the identity matrix of order `3`. If `Q = [q_()ij ]` is a matrix, such that `P^(50)-Q=I`, then `(q_(31)+q_(32))/q_(21)` equals

Similar Questions

Recommended Questions