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A linear system is characterized by, H(jω) = e– bω3. The system is physically—
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- unrealizable
- realizable
- depends on the value of b
- None of these
Correct Option: A
Given that H(jω) = e– bω3
According to Paley-Wiener criterion, the given system will be physically realizable, if condition given below is satisfied.
| = ∫∞– ∞ | · dω < ∞ | 1 + ω2 |
| = ∫∞– ∞ | dω | 1 + ω2 |
| = ∫∞– ∞ | dω | 1 + ω2 |
| = b∫∞– ∞ | dω | 1 + ω2 |
| = b∫∞– ∞ | , (put ω2 = t, 2ω dω = dt) | 1 + t |
| = b |  | ∫∞-∞ |  | – |  | dt |  | ||
| T + 1 | 1 + t |
| = b | | ∫∞-∞ dt - ∫∞-∞ | dt | | ||
| 1 + t |
| ∵ | | is even function | | 1 + ω2 |
= 2[ω – tan– 1ω]∞ 0
| = 2 | | ∞ – | – 0 + 0 | | ||
| 2 |
= 2· ∞
= ∞
