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강의노트 예제] 근궤적 그리기

강의노트 • 조회수 1214 • 댓글 0 • 수정 1년 전  
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G(s)H(s)=ks(s+2)(s+4) G(s)H(s) = \dfrac{k}{s(s+2)(s+4)}

G(s)H(s)=ks(s+1)(s+3)(s+4) G(s)H(s) = \dfrac{k}{s(s+1)(s+3)(s+4)}

G(s)H(s)=k(s26s+34)(s+2)(s+6) G(s)H(s) = \dfrac{k(s^2-6s+34)}{(s+2)(s+6)}

G(s)H(s)=k(s+10)s(s+4)(s+6) G(s)H(s) = \dfrac{k(s+10)}{s(s+4)(s+6)}

G(s)H(s)=k(s+8)(s+2)(s+3)(s+5) G(s)H(s) = \dfrac{k(s+8)}{(s+2)(s+3)(s+5)}

G(s)H(s)=k(s2+2s+2)s2(s+2) G(s)H(s) = \dfrac{k(s^2+2s+2)}{s^2(s+2)}

G(s)H(s)=k(s+2)s3 G(s)H(s) = \dfrac{k(s+2)}{s^3}

G(s)H(s)=ks2s2+3s+2 G(s)H(s) = \dfrac{k s^2}{s^2+3s+2}

G(s)H(s)=1s(s+2)(s2+2s+5) G(s)H(s) = \dfrac{1}{s(s+2)(s^2+2s+5)}

G(s)H(s)=1s(s2+2s+2) G(s)H(s) = \dfrac{1}{s(s^2+2s+2)}

G(s)H(s)=1s(s+1) G(s)H(s) = \dfrac{1}{s(s+1)}

G(s)H(s)=1s(s+1)(s+2) G(s)H(s) = \dfrac{1}{s(s+1)(s+2)}

G(s)H(s)=1s(s+1)(s+2)(s+3) G(s)H(s) = \dfrac{1}{s(s+1)(s+2)(s+3)}

G(s)H(s)=s+3s(s+1)(s+2) G(s)H(s) = \dfrac{s+3}{s(s+1)(s+2)}

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