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== proving this...== | == proving this...== | ||
+ | '''Example of a Linear System''' | ||
<pre> | <pre> | ||
First I will sum the inputs before the system | First I will sum the inputs before the system | ||
Line 22: | Line 23: | ||
y3(t) = 15t+20t = 35t | y3(t) = 15t+20t = 35t | ||
Both approaches yield the same result. Therefore it is linear. | Both approaches yield the same result. Therefore it is linear. | ||
+ | |||
</pre> | </pre> | ||
+ | '''Example of a non-linear System''' | ||
+ | Given the system | ||
+ | y(t) = 10x(t) + 3: | ||
+ | x1(t) = t | ||
+ | y1(t) = 10t + 3 | ||
+ | x2(t) = 4t | ||
+ | y2(t) = 40t + 3 | ||
+ | |||
+ | y1(t) + y2(t) = 50t + 6 | ||
+ | Do this backwards: | ||
+ | z(t) = x1(t)+y1(t) | ||
+ | z(t) = 5t | ||
+ | y[z(t)] = 50t + 6 | ||
+ | |||
+ | 60t+10 is not equal to 60t + 5 |
Latest revision as of 14:06, 11 September 2008
Homework 2 part C
What is a linear system?
A system is linear if:
1. The output of summing any two inputs togerther then sending the result through a system is equal to any two inputs sent through a system than added together.
2. Multiplying an input then sending it through the system equals the input sent through the system then multiplied by the constant.
proving this...
Example of a Linear System
First I will sum the inputs before the system the system is y(t) = 5x(t). a(t) = 3t b(t) = 4t c(t) = a(t) + b(t) c(t) = 3t + 4t y(t) = 5(3t + 4t) = 35t If it works backwards it is linear: y1(t) = 5(3t) = 15t y2(t) = 5(4t) = 20t y3(t) = 15t+20t = 35t Both approaches yield the same result. Therefore it is linear.
Example of a non-linear System Given the system
y(t) = 10x(t) + 3: x1(t) = t y1(t) = 10t + 3 x2(t) = 4t y2(t) = 40t + 3 y1(t) + y2(t) = 50t + 6
Do this backwards:
z(t) = x1(t)+y1(t) z(t) = 5t y[z(t)] = 50t + 6
60t+10 is not equal to 60t + 5