h=U/I
кернеу бойынша кері байланыс коэффициенті үшін I = const болғанда, Һ12 =U/U
ток бойынша күшейту коэффициенті үшін U2 = const, болғанда, Һ2\ = I/I
шығыстық өткізгіштік үшін (і = const) болғанда, Һ22 =U/U
Транзисторлар шала өткізгішті диодтар сияқты маркирленеді, тек белгілеудің екінші элементіне Т (транзистор) әрпі жазылады.
9. Көп электродты және ұластырылған электрондық лампылар
Көп электродты электрондық лампылар деп катодтан, басқарушы тордан және анодтан басқа, қосымша электродтары, әдетте торлары бар лампыларды айтады.
Вакуумдық триодтардың электрод аралық сыйымдылығы едәуір болғандықтан күшейту коэффициенті аз болады. Олардың бүл кемшіліктерін жою үшін басқарушы тор мен анод аралығына қосымша экрандық тор қойылады (79-сурет). Бұл тор анодтық кернеудің анодтық токқа әсерін әлсіретеді, лампының
79-сурет.
а тетродты қосу схемасы; б анодтық және экрандық токтардың графиктері.
өтімділігі азаяды, ал күшейту коэффициента (және ішкі кедергі) артады. Лампының электродтар аралық сыйымдылығы азаяды, ейткені «басқарушы тор анод» участогында бір-біріне тізбектей жалғанған екі конденсатор («басқарушы тор экрандық тор» және «экрандық тор анод») тұрғандай болып шығады.
Алайда, мұндай төрт злектродты лампыларда (тетродта) анодтық кернеудің кейбір мәндерінде динатрондық эффект деп аталатын ұнамсыз құбылыс байқалады. Ол құбылыстьщ мәні мынада: электрондар анодқа соғылып, одан екінші реттік электрондарды (екінші реттік эмиссия) жұлып шығарады, ал олар оң зарядталған экрандық торға тартылып, экрандык, токты арттырады, ал оның есебіне анодтық ток кемиді (79,6-суретте АБ участогы).
Екінші реттік электрондарды кері анодқа теуіп тастау үшін және олардың экрандық торға жолын кесу үшін анод пен экрандық тор арасына катодпен жалғастырылған үшінші тор динатронға қарсы тор орналастырылады (80-сурет). Мүндай бес электродты лампы пентод деп аталады. Үшінші тор да экрандаушы әрекет ететіндіктен, тетродқа қарағанда пентодтың күшейту коэффициенті кепте, ал электрод аралық сыйымдылығы аз. Пентодтың күшейту коэффициенті бірнеше мыңға жетеді, триодта бұл 100-ден аспайды, тетродтарда не бары бірнеше жүзге ғана жетеді; пентодтың ішкі кедергісі миллион омға дейін жетеді.
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)
80-сурет. Пентодты қосу.
Достарыңызбен бөлісу: |