[" 13.Let "A=[[1,4],[2,3]]" ,then "A^(4)...

[" 13.Let "A=[[1,4],[2,3]]" ,then "A^(4)-4A^(3)-5A^(2)+2l" is equal to "(r" is the unit mativ of order "2)],[(1)" A "+21," (2) "-4A-31," (3) "-A-41]

Similar Questions

Explore conceptually related problems

Let A=[[1,42,3]]&A^(4)-4A^(3)-5A^(2)+2I=lambda I('I' is the unit matrix of order 2), then find lambda0(2)1(3)-12(5)-2

Let A=[1 4 2 3]&A^4-4A^3-5A^2+2I=lambdaI (' I ' is the unit matrix of order 2), then find lambda . 0 (2) 1 (3) 2 (4) -2

Let A=[[2,4],[-1,-2]] ,then the value of det(1+2A+3A^(2)+4A^(3)+5A^(4)+...+101A^(100)) equals (where I is the identity matrix of order 2)

If A =[(1,2),(3,4)] then A^(2)-5A equals

If A=[(2,-1),(-1,2)] and i is the unit matrix of order 2, then A^2 is equal to (A) 4A-3I (B) 3A-4I (C) A-I (D) A+I

Let A=[[4,2],[-1,1]] .Then (A-2I)(A-3I) is equal to

" .If "A=[[1,2],[-3,-4]]" and "l" is the identity matrix of order "2," then "A^(2)" equals "

If A= [[1,2],[-3,-4]] and l is the identity matrix of order 2 then A^(2) equals "

If A=[(1, 0,0),(0,1,0),(a,b,-1)] and I is the unit matrix of order 3, then A^(2)+2A^(4)+4A^(6) is equal to