" The matrix "P" is given by "P=[5,6^(-)],[3,4]" then the determinant of "P^(2022)-4P^(2021)" is equal to "

" If matrix " A" is given by "A=[[8,10],[3,4]]," then the determinant of "A^(2021)-8A^(2020)" is "

If matrix A is given by A= [[8,10] , [3,4]] then the determinant of A^(2021)-8A^(2020)=

If the adjoint of a 3 xx 3 matrix P is [{:(,1,4,4),(,2,1,7),(,1,1,3):}] , then the possible value(s) of the determinant of P is (are)

If the adjoint of a 3xx3 matrix P is [(1, 4, 4), (2, 1, 7), (1, 1, 3)], then the possible value(s) of the determinant of P is (are)

A square matrix P satisfies P^2=I-2P where I is the identify matrix if P^(2)+P^(3)+P^(4)=a^(2)I-b^(2)P then a,b=

Let A = [[2,3],[a,0]], a in R be written as P + Q where P is a symmetric matrix and Q is skew symmetric matrix. If det(Q) = 9, then the modulus of the sum of all possible values of determinant of P is equal to :

If P=[[2,-4],[-5,3]] then find P+P^(T) .