(New page: == Linear system == Linear system is a system that satisfies a principle of superpositon. For example, if sinusoid signal is input of a linear system, the frequency of output signal is no...) |
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== Example of Linear system == | == Example of Linear system == | ||
| − | y1(t) = T{x1(t)} | + | y1(t) = T{x1(t)}<br> |
| − | y2(t) = T(x2(t)) | + | y2(t) = T(x2(t))(br> |
| − | W(t) a*T{x1(t)} + a*T{x(2)} | + | W(t) a*T{x1(t)} + a*T{x(2)}<br> |
| − | Y(t) = T{a*x1(t) + a*x2(t)} | + | Y(t) = T{a*x1(t) + a*x2(t)}<br> |
If W(t) eaquals to Y(t), System T is linear system. | If W(t) eaquals to Y(t), System T is linear system. | ||
Revision as of 07:43, 6 September 2008
Linear system
Linear system is a system that satisfies a principle of superpositon. For example, if sinusoid signal is input of a linear system, the frequency of output signal is not changed. Only amplitude and phase can be changed.
Example of Linear system
y1(t) = T{x1(t)}
y2(t) = T(x2(t))(br>
W(t) a*T{x1(t)} + a*T{x(2)}
Y(t) = T{a*x1(t) + a*x2(t)}
If W(t) eaquals to Y(t), System T is linear system.
