[{"@context":"http:\/\/schema.org\/","@type":"BlogPosting","@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/1500#BlogPosting","mainEntityOfPage":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/1500","headline":"\u6163\u6027\u30e1\u30f3\u30d0\u30fc – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2\u3001\u7121\u6599\u200b\u200b\u767e\u79d1\u4e8b\u5178","name":"\u6163\u6027\u30e1\u30f3\u30d0\u30fc – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2\u3001\u7121\u6599\u200b\u200b\u767e\u79d1\u4e8b\u5178","description":"before-content-x4 \u6163\u6027 – \u81ea\u52d5\u5316\u306f\u3001\u900f\u904e\u7387\u304c\u5f62\u306b\u306a\u3063\u3066\u3044\u308b\u30b7\u30b9\u30c6\u30e0\u3067\u3059 g \uff08 s \uff09\uff09 = k(1+sT1)(1+sT2)\u22ef(1+sTn)\u3001 {displaystyle g\uff08s\uff09= {frac {k} {\uff081+st_ {1}\uff09\uff081+st_ {2}\uff09cdots\uff081+st_ {n}\uff09}\u3001}} after-content-x4 \u3069\u3053\uff1a","datePublished":"2020-06-15","dateModified":"2020-06-15","author":{"@type":"Person","@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/author\/lordneo#Person","name":"lordneo","url":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/author\/lordneo","image":{"@type":"ImageObject","@id":"https:\/\/secure.gravatar.com\/avatar\/44a4cee54c4c053e967fe3e7d054edd4?s=96&d=mm&r=g","url":"https:\/\/secure.gravatar.com\/avatar\/44a4cee54c4c053e967fe3e7d054edd4?s=96&d=mm&r=g","height":96,"width":96}},"publisher":{"@type":"Organization","name":"Enzyklop\u00e4die","logo":{"@type":"ImageObject","@id":"https:\/\/wiki.edu.vn\/wiki4\/wp-content\/uploads\/2023\/08\/download.jpg","url":"https:\/\/wiki.edu.vn\/wiki4\/wp-content\/uploads\/2023\/08\/download.jpg","width":600,"height":60}},"image":{"@type":"ImageObject","@id":"https:\/\/wikimedia.org\/api\/rest_v1\/media\/math\/render\/svg\/3647748e0bea39d22563d7a8bd7282f92f7c67ee","url":"https:\/\/wikimedia.org\/api\/rest_v1\/media\/math\/render\/svg\/3647748e0bea39d22563d7a8bd7282f92f7c67ee","height":"","width":""},"url":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/1500","wordCount":5032,"articleBody":"     (adsbygoogle = window.adsbygoogle || []).push({});before-content-x4\u6163\u6027  – \u81ea\u52d5\u5316\u306f\u3001\u900f\u904e\u7387\u304c\u5f62\u306b\u306a\u3063\u3066\u3044\u308b\u30b7\u30b9\u30c6\u30e0\u3067\u3059 g \uff08 s \uff09\uff09 = k(1+sT1)(1+sT2)\u22ef(1+sTn)\u3001 {displaystyle g\uff08s\uff09= {frac {k} {\uff081+st_ {1}\uff09\uff081+st_ {2}\uff09cdots\uff081+st_ {n}\uff09}\u3001}}        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4\u3069\u3053\uff1a        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4k \u2208 R{displaystyle kin mathbb {r}}  – \u30b7\u30b9\u30c6\u30e0\u306e\u5f37\u5316\u3001 Ti\u2208 R+\u3001 \u79c1 = \u521d\u3081 \u3001 2 \u3001 … \u3001 n {displaystyle t_ {i} in mathbb {r} ^{+}\u3001i = 1,2\u3001dots\u3001n}  – \u4e00\u5b9a\u306e\u6642\u9593\u6163\u6027\u3001 n {displaystyle n}  – \u30e1\u30f3\u30d0\u30fc\u306e\u6163\u6027\u306e\u5217\u3002 \u6700\u521d\u306e\u884c\u306e\u6163\u6027\u30e1\u30f3\u30d0\u30fc\u306b\u306f\u3001\u30ad\u30e3\u30e9\u30af\u30bf\u30fc\u306e\u9001\u4fe1\u304c\u3042\u308a\u307e\u3059\u3002        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4g \uff08 s \uff09\uff09 = k1+sT\u3002 {displaystyle g\uff08s\uff09= {frac {k} {1+st}}\u3002}} \u885d\u52d5\u7684\u306a\u7b54\u3048\uff1a g \uff08 t \uff09\uff09 = kT e\u2212tTde 1\uff08 t \uff09\uff09 \u3002 {displaystyle g\uff08t\uff09= {frac {k} {t}} e^{ –  {frac {t} {t}}} cdot mathbf {1}\uff08t\uff09\u3002}} \u6163\u6027\u3068\u884c\u306e\u8db3\u9996\u306e\u7279\u6027\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059\u3002 \u30aa\u30da\u30ec\u30fc\u30bf\u30fc\u30d5\u30a3\u30fc\u30eb\u30c9\uff1a H(s)=G(s)\u22c5X(s)=k1+sT\u22c51s=ks(1+sT),{displaystyle h\uff08s\uff09= g\uff08s\uff09cdot x\uff08s\uff09= {frac {k} {1+st}} cdot {frac {1} {s}} = {frac {k} {s\uff081+st\uff09}}\u3001}} h(t)=k(1\u2212e\u2212tT)\u22c51(t).{displaystyle h\uff08t\uff09= kleft\uff081-e^{ –  {frac {t} {t}}}\u53f3\uff09cdot mathbf {1}\uff08t\uff09\u3002} \u6163\u6027\u304a\u3088\u3073\u884c\u306e\u6b63\u5f26\u6ce2\u7279\u6027\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059\u3002 \u3068 \uff08 t \uff09\uff09 = kT\u03c91+\u03c92T2e\u2212tT+ k1+\u03c92T2\u7f6a \u2061 \uff08 \u304a\u304a t + \u03d5 \uff09\uff09 \u3002 {dissispastyle y\uff08t\uff09= {frac {ktomega} {1+omega^{2} t^{2}}} e^{ –  {frac {t} {t}}}+{frac {k} {sqrt {{2+omega^{} {2}}} \u632f\u5e45\u76f8\u7279\u6027\uff1a g \uff08 j \u304a\u304a \uff09\uff09 = k1+j\u03c9T= k1+(\u03c9T)2 –  j k\u03c9T1+(\u03c9T)2\u3001 {displaystyle g\uff08jomega\uff09= {frac {k} {1+jomega t}} = {frac {k} {1+\uff08omega t\uff09^{2}}}  –  j {frac {komega t} {1+\uff08omega t\uff09^{2}}}}}} \u53d7\u3051\u5165\u308c\u308b g \uff08 j \u304a\u304a \uff09\uff09 = p \uff08 \u304a\u304a \uff09\uff09 + j Q \uff08 \u304a\u304a \uff09\uff09 {displaystyle g\uff08jomega\uff09= p\uff08omega\uff09+jq\uff08omega\uff09} \u53d6\u5f97\u3055\u308c\u307e\u3059\uff1a p \uff08 \u304a\u304a \uff09\uff09 = k1+(\u03c9T)2\u3001 {displaystyle P\uff08omega\uff09= {frac {k} {1+\uff08omega t\uff09^{2}}}\u3001} Q \uff08 \u304a\u304a \uff09\uff09 =  –  k\u03c9T1+(\u03c9T)2\u3002 {displaystyle q\uff08omega\uff09=  –  {frac {komega t} {1+\uff08omega t\uff09^{2}}}}}} \u4f4d\u76f8\u7279\u6027\uff1a \u03d5 \uff08 \u304a\u304a \uff09\uff09 =  –  arctg \uff08 \u304a\u304a t \uff09\uff09 \u3002 {displaystyle phi\uff08omega\uff09= -operatorname {arctg}\u3001\uff08omega t\uff09\u3002} 2\u756a\u76ee\u306e\u6163\u6027\u30e1\u30f3\u30d0\u30fc\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059\u3002 g \uff08 s \uff09\uff09 = k(1+sT1)(1+sT2)\u3002 {displaystyle g\uff08s\uff09= {frac {k} {\uff081+st_ {1}\uff09\uff081+st_ {2}\uff09}}}}} \u885d\u52d5\u7684\u306a\u7b54\u3048\uff1a g \uff08 t \uff09\uff09 = kT1\u2212T2(e\u2212tT1\u2212e\u2212tT2)de 1\uff08 t \uff09\uff09 \u3002 {displaystyle g\uff08t\uff09= {frac {k} {t_ {1} -t_ {2}}}\u5de6\uff08e^{ –  {frac {t} {t_ {1}}}}  –  e^{ –  {frac {t}} {t_ {2}}}}}}}}}}}} 2\u6b21\u6163\u6027\u30e1\u30f3\u30d0\u30fc\u306e\u8db3\u9996\u306e\u7279\u6027\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059\u3002 \u30aa\u30da\u30ec\u30fc\u30bf\u30fc\u30d5\u30a3\u30fc\u30eb\u30c9\uff1a H(s)=G(s)\u22c5X(s)=k(1+sT1)(1+sT2)\u22c51s=ks(1+sT1)(1+sT2),{displaystyle h\uff08s\uff09= g\uff08s\uff09cdot x\uff08s\uff09= {frac {k} {\uff081+st_ {1}\uff09\uff081+st_ {2}\uff09}} cdot {frac {1} {s}} = {frac {k}} {s\uff081+st_ {1}}}}}}}} h(t)=k(1\u2212T1T1\u2212T2e\u2212tT1+T2T1\u2212T2e\u2212tT2)\u22c51(t).{displaystyle h\uff08t\uff09= kleft\uff081- {frac {t_ {1}} {t_ {1} -t_ {2}}} e^{ –  {frac {t} {t_ {1}}}}}+{frac {t_ {2} {} {} {} {} {} {} {} {} {} {} {} {} {} {} {} {}} –  {frac {t} {t_ {2}}}\u53f3\uff09cdot mathbf {1}\uff08t\uff09\u3002} \u632f\u5e45\u76f8\u7279\u6027\uff1a g \uff08 j \u304a\u304a \uff09\uff09 = k(1+j\u03c9T1)(1+j\u03c9T2)\u3001 {displaystyle g\uff08jomega\uff09= {frac {k} {\uff081+jomega t_ {1}\uff09\uff081+jomega t_ {2}\uff09}}\u3001} \u53d7\u3051\u5165\u308c\u308b g \uff08 j \u304a\u304a \uff09\uff09 = p \uff08 \u304a\u304a \uff09\uff09 + j Q \uff08 \u304a\u304a \uff09\uff09 {displaystyle g\uff08jomega\uff09= p\uff08omega\uff09+jq\uff08omega\uff09} \u5909\u63db\u5f8c\u3001\u305d\u308c\u306f\u53d6\u5f97\u3055\u308c\u307e\u3059\uff1a p \uff08 \u304a\u304a \uff09\uff09 = k(1\u2212\u03c92T1T2)1+(\u03c9T1)2+(\u03c9T2)2+(\u03c92T1T2)2\u3001 {displaystyle p\uff08omega\uff09= {frac {k\uff081-omega^{2} t_ {1} t_ {2}\uff09} {1+\uff08omega t_ {1}\uff09^{2}+\uff08omega t_ {2}\uff09^{{2} {{2} {{2} {2} {{2} {{2} {{2} {{2} {{2} {{2} {2} {{2} {{2} {{2} {2} {2} {2} {{{2}\uff09 2}}}\u3001} Q \uff08 \u304a\u304a \uff09\uff09 = \u2212k\u03c9(T1+T2)1+(\u03c9T1)2+(\u03c9T2)2+(\u03c92T1T2)2\u3002 {displaystyle q\uff08omega\uff09= {frac {-komega\uff08t_ {1}+t_ {2}\uff09} {1+\uff08omega t_ {1}\uff09^{2}+\uff08omega t_ {2}\uff09^{2}+\uff08beyga^{2} {2} {2} {2} {2} {2} {2} {2} {2} {2} {2} {2}\uff09 }\u3002} \u4f4d\u76f8\u7279\u6027\uff1a \u03d5 \uff08 \u304a\u304a \uff09\uff09 = arctg \u03c9(T1+T2)\u03c92T1T2\u22121\u3002 {displaystyle phi\uff08omega\uff09= operatorname {arctg}\u3001{frac {omega\uff08t_ {1}+t_ {2}\uff09} {omega ^{2} t_ {1} t_ {2} -1}}}\u3002       (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4"},{"@context":"http:\/\/schema.org\/","@type":"BreadcrumbList","itemListElement":[{"@type":"ListItem","position":1,"item":{"@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/#breadcrumbitem","name":"Enzyklop\u00e4die"}},{"@type":"ListItem","position":2,"item":{"@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki47\/archives\/1500#breadcrumbitem","name":"\u6163\u6027\u30e1\u30f3\u30d0\u30fc – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2\u3001\u7121\u6599\u200b\u200b\u767e\u79d1\u4e8b\u5178"}}]}]