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[[Category:ECE301Spring2013JVK]] [[Category:ECE]] [[Category:ECE301]] [[Category:Probability]] [[Category:Problem_solving]] [[Category:LTI_systems]] [[Category:Convolution]] [[Category:Period]] | [[Category:ECE301Spring2013JVK]] [[Category:ECE]] [[Category:ECE301]] [[Category:Probability]] [[Category:Problem_solving]] [[Category:LTI_systems]] [[Category:Convolution]] [[Category:Period]] | ||
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uninvertible: y(t) = (sum) k=0 -> 5 kx[n] | uninvertible: y(t) = (sum) k=0 -> 5 kx[n] | ||
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| + | stable: y[n] = x[n] ^ x[n] | ||
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| + | y[n] = n^2x[n-1] | ||
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| + | time variying: y[n] = (n^.5)x[x+1] - 3 | ||
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| + | time invariant: y[n] = 18x[n+1] - 1047(x[n])^2 | ||
[[Bonus_point_1_ECE301_Spring2013|Back to first bonus point opportunity, ECE301 Spring 2013]] | [[Bonus_point_1_ECE301_Spring2013|Back to first bonus point opportunity, ECE301 Spring 2013]] | ||
Latest revision as of 12:04, 11 February 2013
Question 1:
linear system: y = x1(2t) + x1(t)
nonlinear: y = (x(t)) • (x(t-1))
causal: y = et+5x(t-1)
noncausal: y = et-5x(t+1)
with memory: y = (x[n-5])^3
memoryless: y = (x[n]) ^ 3
invertible: y(t) = (x(t)) ^ t
uninvertible: y(t) = (sum) k=0 -> 5 kx[n]
stable: y[n] = x[n] ^ x[n]
y[n] = n^2x[n-1]
time variying: y[n] = (n^.5)x[x+1] - 3
time invariant: y[n] = 18x[n+1] - 1047(x[n])^2
