Let α be a root of the equation x2+ x + 1 =0 and the matrix A = (1/√3)[1&1&1 1&α&α2 1&α2&α4], then the matrix A31 is equal to :

Question

Let α be a root of the equation x2+ x + 1 =0 and the matrix A = (1/√3)[1&1&1 1&α&α2 1&α2&α4], then the matrix A31 is equal to : (A) A (B) A2 (C) A3 (D) I3

Tardigrade Admin · Accepted Answer

x2+ x + 1 =0 α = ω α2 = ω2 A = (1/√3)[1&1&1 1&ω&ω 2 1&ω2 &ω ] A2= [1&0&0 0&0&1 0&1&0] ⇒ A4 = A2 . A2 = I3 A31 = A28. A3 = A3.

Q. Let $α$ be a root of the equation $x^{2} + x + 1 = 0$ and the matrix $A = \frac{1}{3} ⎣ ⎡ 111 1 α α^{2} 1 α^{2} α^{4} ⎦ ⎤$ , then the matrix $A^{31}$ is equal to :

$A$

$A^{2}$

$A^{3}$

$I_{3}$

$x^{2} + x + 1 = 0$
$α = ω$
$α^{2} = ω^{2}$
$A = \frac{1}{3} ⎣ ⎡ 111 1 ω ω^{2} 1 ω^{2} ω ⎦ ⎤$
$A^{2} = ⎣ ⎡ 100001010 ⎦ ⎤$
$\Rightarrow A^{4} = A^{2} . A^{2} = I_{3}$
$A^{31} = A^{28} . A^{3} = A^{3.}$

Q. Let α be a root of the equation x2+x+1=0 and the matrix A=3​1​⎣⎡​111​1αα2​1α2α4​⎦⎤​, then the matrix A31 is equal to :

A

A2

A3

I3​

x2+x+1=0 α=ω α2=ω2 A=3​1​⎣⎡​111​1ωω2​1ω2ω​⎦⎤​ A2=⎣⎡​100​001​010​⎦⎤​ ⇒A4=A2.A2=I3​ A31=A28.A3=A3.

Q. Let $α$ be a root of the equation $x^{2} + x + 1 = 0$ and the matrix $A = \frac{1}{3} ⎣ ⎡ 111 1 α α^{2} 1 α^{2} α^{4} ⎦ ⎤$ , then the matrix $A^{31}$ is equal to :

$A$

$A^{2}$

$A^{3}$

$I_{3}$

$x^{2} + x + 1 = 0$
$α = ω$
$α^{2} = ω^{2}$
$A = \frac{1}{3} ⎣ ⎡ 111 1 ω ω^{2} 1 ω^{2} ω ⎦ ⎤$
$A^{2} = ⎣ ⎡ 100001010 ⎦ ⎤$
$\Rightarrow A^{4} = A^{2} . A^{2} = I_{3}$
$A^{31} = A^{28} . A^{3} = A^{3.}$