"Suppose "A" ,"B" are two distinct "2tim...

`"Suppose "A" ,"B" are two distinct "2times2" matrices such that "A^(2)-5A+6I=0,B^(2)-5B+6I=0,Then (A) A^(3)-B^(3)=19(A-B), (B) A^(4)-B^(4)=65(A-B)(C)A^(5)-B^(5)=211(A-B) (D) A^(6)-B^(6)=665(A-B)"`

Similar Questions

Explore conceptually related problems

Suppose A, B are two distinct 2times2 matrices such that A^(2)-5A+6I=O , B^(2)-5B+6I=O . Then possible values of |A+B| are

If A and B are 2-rowed square matrics such that (A+B)=[(4,-3),(1,6)] and (A-B)=[(-2,-1),(5,2)] then AB=?

Find a 2xx2 matrix B such that [[6,5],[5,6]] B=[[11,0],[0,11]]

If A = {2, 3, 5}, B = {2, 5, 6}, then (A - B) xx (AnnB) is

(2a ^ (2) + 3b ^ (2)) (5a ^ (2) -6b ^ (2))

Let a, b, c, d be distinct real numbers such that a, b are roots of x^2-5cx-6d=0 and c, d are roots of x^2-5ax-6b=0 . Then b+d is

If A and B are two matrices such that A + B = [{:(3, 8),(11, 6):}] " and " A-B = [{:(5, 2),(-3, -6):}] , then find the matrices A and B.

If (a)/(b)=(4)/(3), then (3a+2b)/(3a-2b)=?( a) -1 (b) 3 (c) 5(d)6

The product (a+b)(a-b)(a^(2)-ab+b^(2))(a^(2)+ab+b^(2)) is equal to: a^(6)+b^(6)(b)a^(6)-b^(6)(c)a^(3)-b^(3)(d)a^(3)+b^(3)