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From Wikipedia, the free encyclopedia
X
(
t
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=
X
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t
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X
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{\displaystyle \mathbf {X} (t)={\begin{bmatrix}X_{1}(t)\\X_{2}(t)\\X_{3}(t)\\\end{bmatrix}}}
L
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{\displaystyle \mathbf {L} ={\begin{bmatrix}F_{1}&F_{2}&F_{3}\\P_{1}&0&0\\0&P_{2}&0\\\end{bmatrix}}}
X
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X
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{\displaystyle \mathbf {X} (1)=\mathbf {L} \times \mathbf {X} (0)}
X
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{\displaystyle \mathbf {X} (2)=\mathbf {L} \times \mathbf {X} (1)=\mathbf {L} \times \mathbf {L} \times \mathbf {X} (0)=\mathbf {L} ^{2}\times \mathbf {X} (0)}
X
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n
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X
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{\displaystyle \mathbf {X} (n)=\mathbf {L} ^{n}\times \mathbf {X} (0)}
From Wikipedia, the free encyclopedia
X
(
t
)
=
X
1
(
t
)
X
2
(
t
)
X
3
(
t
)
{\displaystyle \mathbf {X} (t)={\begin{bmatrix}X_{1}(t)\\X_{2}(t)\\X_{3}(t)\\\end{bmatrix}}}
L
=
F
1
F
2
F
3
P
1
0
0
0
P
2
0
{\displaystyle \mathbf {L} ={\begin{bmatrix}F_{1}&F_{2}&F_{3}\\P_{1}&0&0\\0&P_{2}&0\\\end{bmatrix}}}
X
(
1
)
=
L
×
X
(
0
)
{\displaystyle \mathbf {X} (1)=\mathbf {L} \times \mathbf {X} (0)}
X
(
2
)
=
L
×
X
(
1
)
=
L
×
L
×
X
(
0
)
=
L
2
×
X
(
0
)
{\displaystyle \mathbf {X} (2)=\mathbf {L} \times \mathbf {X} (1)=\mathbf {L} \times \mathbf {L} \times \mathbf {X} (0)=\mathbf {L} ^{2}\times \mathbf {X} (0)}
X
(
n
)
=
L
n
×
X
(
0
)
{\displaystyle \mathbf {X} (n)=\mathbf {L} ^{n}\times \mathbf {X} (0)}
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