Choose correct option for a stable system : Roots of the characteristic equation of the system are real and negativeArea within the impulse response is finite ?->(Show Answer!)

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1. Choose correct option for a stable system : Roots of the characteristic equation of the system are real and negativeArea within the impulse response is finite

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By: guest on 02 Jun 2017 12.55 am

From Statement 1: Roots of the characteristics equation of the system are real and negative i.e. the poles are on the left half plane. Hence the system is stable. From Statement 2: Area within the impulse response is finite i.e. it is finite duration signal. It produces a bounded output. Hence system is stable. So both the statements are true.

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