Тест: Электроника

Тестирование – это одна из форм проверки степени усвоения материала. Оно предоставляет возможность выявить пробелы в знаниях, скорректировать обучение и повысить его результативность на данном этапе.

Основы электротехники и электроники. Для проверки знаний пройдите тест ниже:

1. Какова валентность исходных материалов для изготовления полупроводниковых приборов?




2. При каком напряжении работает кремниевый стабилитрон?



3. Что является недостатком полупроводникового диода?



4. Каких носителей заряда больше в полупроводнике p-типа




5. Какое включение p-n перехода называется прямым:



6. Что такое рекомбинация?



7. Чем объясняется изменение толщины p-n перехода при включении внешнего источника?



8. Какой участок ВАХ является рабочим для п/п стабилитрона? data:image/jpeg;base64,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




9. Какого типа электропроводности обозначенный полупроводниковый прибор?




10. Какая из схем включения транзистора обеспечивает максимальное усиление мощности?




11. Какой из h-параметров является выходной проводимостью?




12. Какое напряжение подаётся на коллекторный переход в транзисторе?



13. Сколько p-n переходов в биполярном транзисторе?



14. Почему сопротивление эмиттерного перехода в транзисторе мало



15. Ток какого электрода транзистора самый наибольший?



16. Зависят ли вторичные параметры транзистора от схемы включения?


17. Как называется данная характеристика транзистора Iэ = f (Uэк)?




18. Какая это схема включения транзистора? data:image/jpeg;base64,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



19. Коэффициент усиления по току равен &gamma=(&DeltaI_э)/(&DeltaI_б ). Какая это схема включения?



20. На каком принципе работает полевой транзистор?




21. Какое обозначение полевого транзистора правильное?




22. Какой это прибор? data:image/jpeg;base64,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




23. Как включены переходы динистора на участке СД? data:image/jpeg;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQH/2wBDAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQH/wAARCACHAMgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD+/iiiigAooooAKKKKACiiigApCcAn09OtLSN0P+ec8dxQAzzMDJU47Eck87cY6Zz2z0754pd/IAB5/wDr/XjgcjscjPNfnn+0l4x0rQ/2z/2GfC938X/GfgqPxjqHxaTV/AOh+O9a8P8Ahnx0NI8KwXngyLxV4asZRp2spJ4qcWNkt+sQ1CR20tvtMa+Qvx5/wXn/AGsPj38Av2SdY8Efsi+J5vCP7SfjC1i8c2vi+zl8uf4c/Cb4eeL/AAf/AMJj4ouZVWQ2kfiXXtc8KfDayaRAt4PFepLAQ1rIUAP3QBycY/Lkc9P68jj3p1fNv7JHx1/4aM+AXgP4m3+njQfF9xaXvhj4neE2Ki48G/FjwXqF14W+JPhS6iyXhbR/FulapFaCTDXGmtY3i5huYmb6SoAKKKRs44OCTj9D/Lr+HfoQBaK+IPhZ+3/8Afjz4S/a18T/AAO1HX/iG/7Gnjj4i/DL4radHod34bS8+IHwz0KbXPEHh/wnrfiNNP0PXYCIJNOh1q2vjpUeoI6XNxBEokfZ/Zi/au1j9onXPFWhaz8EPFnwhuPDngH4SfEW2m8SeL/h/wCKYdb0L4x6XrOs+G47YeCte1iWyvrTT9Fmk1SHUEt44pLiBLaW6BdlAPsaiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAEIBOSATxyQM8HI/I8j0PNfj3/AMFn/hj4GtP2DP2xPjHF4es/+Fl6t8JPhx8PbvxdK9zNqQ8EaV8bvB2v2nhu1Ekz29lpv9tajd6ncx2cMD3t40M13JMba18n9ha/Lf8A4LU/8owP2sv+xV8Ff+rX8BUAfot4R8B+DvBMvia78JeG9K8O3HjjxJdeNfGD6Tax2Y8Q+LtSsrCy1HxHqUcW2KbVtQttOso769CLNdtbRyXBkkDOeyqOL/Vr/up/6AtSUAB4BPpX5z/8FP8A9qfxb+zN+zLc2Pwahi1b9qL9onxdoH7Nf7KfhoktPqPxt+Ksk2j6N4ilt0PnHRPhvpA1j4j+IrrY0FvpXhiVLhk+0xhv0YPQ8Z46evtX4f8A7PeP+CgP/BSz4qftb3v/ABNP2a/+Cfsvi/8AZV/ZWDET6L4z/aJ1UW8P7UPxr005ktrweEoodN+C3hnU7clI2sfFc1pKr3VygAPsj4IfsRaZ+zt+wJZ/sXfCbxJbaJrafB3xN4L1T4o6rpMet3uv/Ezx5pOof8J38VvE1m8lrN4h1zxD4q1rVvEV0b66MkzTQ2ksxt7eOMbH7Mf7JPi/9nP4g+KPEd78dfEXxY8MeJPg/wDBz4aR6R4w8K+D9I1rRr/4Nxa/pGianY6r4O0fw/azaXd+G9aSzudPvrC7vW1K2a/fUnWbyU+4P8n60UAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFflv/AMFqf+UYH7WX/Yq+Cv8A1a/gKv1Ir8t/+C1P/KMD9rL/ALFXwV/6tfwFQB+okX+rX/dT/wBAWpKji/1a/wC6n/oC08kdM8n0/nntj1P4c0Afmh/wVR/aa8dfAL9nG08A/AiSO4/av/ay8a6P+zF+y3pgxJPafEr4jQ3VvqXxCuIEPmroHwi8GweIPiJrV95b29udDsrWchr+FZPp/wDZD/Zn8C/sd/s3fCH9m34dRu3hv4V+DtP0CTVbj5tS8U+IWU33ivxlrdw2ZbzXfF3iW71TxDq93OzzTX2ozFpGCqB+Zn7K0qft6f8ABQ741/t4arLHqH7Of7HB8Yfse/sXPO6yaF4l+IC3tvb/ALVXx90mSRjaXJu/EVhafB3wvrVvkTaL4Z1tra4Avp1b9wwQehz7jpwcHn2PB9Dx60ALRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV+W/wDwWp/5RgftZf8AYq+Cv/Vr+Aq/Uivy3/4LU/8AKMD9rL/sVfBX/q1/AVAH6iRf6tf91P8A0Ba+Iv8AgpBY/te6v+xV8ftB/YR0bwxrf7UPiXwTc+FvhzD4q8RW/hW004+JZ4dE8Q6/pGtX0ttptt4q8P8Ahy+1XWfCo1S8s9Ok16ysFu7hU/dyfbsX+rX/AHU/9AWpMD09vw9KAPxp8K/ArwT8Iv2Xv2M/2f8Aw78N9T8d/CP9mLS9L8L/ALTX7P8A4BWTx14sfxLd/CjUEtbzW/C0E9jqfjprX4u6uvi3UNRj81NTuJpPFFpDqEVq5i/Sf9nDwL4c+GnwR+HHgfwhpXj3QvDOgeH1j0XRPihfvqfxA0nT769u9Tt9O8VXkt1fTtqdot6YWguLy5ubSFIbS4meeCU11vjLwHD4mBv9H1a/8FeLopNOktfGnh2CwXWWj0mW6mstJ1gXdrND4h8NNJfXn2vw9qglsJPtEs9ubW98m7iybD4h3Gk6tJoHxJstN8GX9/4kOg+CtWbV4J9A8ercw3F3p/8AZU8qwXGk6+8EDwXvhzVUWc3qrHot7rMUquoB6xRTVJ53HknOD79MA8+3fkH6U6gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAr8t/+C1P/KMD9rL/ALFXwV/6tfwFX6kV+W//AAWp/wCUYH7WX/Yq+Cv/AFa/gKgD9RIv9Wv+6n/oC1JUcX+rX/dT/wBAWpKADrWdqukaXrdnJp2sabYatp8rwyS2OpWkF7aSS280dxbytb3McsRlt7iKK4t5Nu+GeOOaNlkjVq0aKAPE47fxz8NLi0trc658T/BWpeILyS8udR1PTx4x+Hek34gkg+zvNBav418M6ZefbTMLm7/4SvS9NntorYeII7IRJ6b4Z8U+HPGWi2XiLwrrem+IND1BS1nqmlXUV5aTFGaOWLzImbyri3lV4Lq1mEdxazpJBcRRTI6LulQTnJGBjjHqD6Z7euK8z1fwHPbaxb+JfAuqN4X1O2m1S81fw9bpbW/hDxzc6lBvZ/FVlDY3Etvqr30NrMnizTIzrcEKXENwuo20xtKAPTqK818I/EWDW5bHw/4nsIfBPxFn0+51G78A6jq+nahqX2OzvrjT59U0a7s5BDr2hSzW5nttRtYopktZ7ZtTsNNuJTbJ6SpJGT/n9T3/AM9yALRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFflv/wAFqf8AlGB+1l/2Kvgr/wBWv4Cr9SK/Lf8A4LU/8owP2sv+xV8Ff+rX8BUAfqJF/q1/3U/9AWn5HqPzrw349/tJfAj9ln4c6j8Vf2hvir4L+EfgDSIDLeeIvGmtWmk2shjhDm2sopn+1ajePgCO0sYLi4dmULGcivxZ/wCH1/xx/ahnudP/AOCWv/BOP9oD9qvQnmltNN/aA+LCWn7On7ON5LHvH2nTvGPxBk02+8RWG5C0VxoVtdecoC7YmbAAP6Gcg9Dmiv58Yfhp/wAHHnxvAvPFP7Q3/BP/APYs0W9kif8A4R7wB4A8cftC+N9Kt3aTzobrUtfh8JeGpLyKMxqr2Os3dvK4LrJDVpf+CVX/AAU+8W20UnxN/wCC7X7Q1reyzPJf2fwj/Z5+E3gfSvKbpBpp1PVfEV1aAf35/tTYyO+aAP6BKMD0H/6+v51/Pjff8ENvjXr7wf8ACU/8Fnv+CluqwgN9sj03xZ8MvDb3RYEny59K8DrJbAOFZNpkaNQ8asFkOLlp/wAG/vgmfy28T/8ABSv/AIKreIpVt/Kldf2pNN0lJZS255fKt/h5OiI/IMHzLg/eOKAP3Z8VeFNF8VWfkakklrfwW+oQ6R4h0yWOw8S+G5dTtHsrrUPDetBGutHv2hcKbi2YCVVWO4jnhzE3nVp4t174eeVpPxEvYdV8IaX4eguZPjRdajomnxSahBcmG5tvG2gQR6fFoNxNHNZtZ6vo66hpOosLyW9j0B0hgn/GBv8Ag3Q/Zxup2m1f9uH/AIKnaxG4fdbXf7ZN5bxFmIIbdpvgOxmAToI1lERydyNwBo2n/BuV+xhD9nN5+0J/wUS1iSDfmXU/20viMXuBIHVln+w21ijI0bmFljSISRfJIH3OWAP34ikjmijlikSWKWNJIpY3WSOSN1DJJHIhKujqQyupKspBBIIqSvnb9lb9mjwR+yF8CvA37Pnw48Q/EXxT4L+H8Gp22iaz8V/G2p/ELxxPBqer3usNDqninVlS7vYbOa+e002ARwwWGnQWtlBGsUK19EE49T9P8/5yKAFopMgAk8Yz19vT1z2paACiiigDwb9oX4t+PPg14Hg8VfDz9n74k/tI67Nr1jpMngH4Wan4D0nxJbWF1Bdyz+IJbn4ieKvCOgtpthJbw29zFHqrX7SXkDQWsiLM0fxR/wAN+/tUn/nEn+2h/wCFx+ymP5/Hiv1P4HPA7k/h1z9B+QoBB6HNAH5Y/wDDfv7VX/SJP9s//wALn9lL/wCfxR/w37+1V/0iT/bP/wDC5/ZS/wDn8V+p9FAH5Yf8N+/tVf8ASJP9s/8A8Ln9lL/5/FH/AA37+1V/0iT/AGz/APwuf2Uv/n8V+pxZV+8wXPTJAzxnv7c/SqxvrIEg3lqCDgg3EQIPoQX4Pt1oA/Lr/hv39qr/AKRJ/tn/APhc/spf/P4o/wCG/f2qv+kSf7Z//hc/spf/AD+K/SbUfHPgnRw7av4w8LaWschic6j4g0mxCShSxjc3N3EFkCgsUOGCgkjAzXBah+0d+zzpNvJd6p8ePgzptpFkS3WofFHwRZ28ZUEkSTXOuRxpgAk7mGADmgD4W/4b9/aq/wCkSf7Z/wD4XP7KX/z+KP8Ahv39qr/pEn+2f/4XP7KX/wA/ivXviB/wVE/4JwfC2Bbnx7+3b+yf4dikWVohP8ePhxeTS+QjvKsVrpviC9uJZFET/u44mkcgqiliAfhrxr/wcWf8Ez9OvG0L4LeLvjV+154vkZYrXwt+yv8AAD4o/Ema6mkWMQLD4l1HQfDXgeSKRpUEk8PieZIAWeULtAYA+hz+37+1UP8AnEn+2f8A+Fx+ymen0+O559B3PFfjN/wW6/4K9at4W/Y6+IX7MfxU/Yj+P/wT+MH7TWi6d4a+CmleOPG37O+uzanr2leL/DusWmsa34b8B/F3xP4r07wXFqOlw6bf+JJ9Hj0pbu4SxW8+0Mwj+v7z9pj/AILeft540D9l/wDZX8J/8Ezvg5rOI7z9oT9rPUtM+JHx7OkXAEbXfgX4JeHjJ4X8P6pJAzywTeKbvxNHbTCMNBazRl38b/bB/wCCU3wK/Yz/AOCc37aHxs8QeIvG/wC01+1/498I+CW+JX7Wfx71WTxj8VNflk+KvgPzdM8O3F801n4H8LwsTHY+H/DcVnaWtsEiU+SBEoB85fAX9mn9prxt8SrH9qz/AIKo/wDBNn9sL9u/9qZLx9S8L+C9a8Wfsun9kf8AZ8gFwJdM0X4QfBzVvjomj69qthAojvvHPjnTNQ1C8neRtP0zS9vnT/uFa/t4/tQWNta2Vl/wSL/bJs7KygitbSztfGn7J1va2ttbxrFb29vbw/HZIYIIIkWOGGJEjijVURQqqB+qkX+rX/dT/wBAWpKAPyv/AOG+/wBqnOf+HSf7Z+f+x5/ZR9iBx8eBnGOM56ml/wCG/f2qv+kSf7Z//hc/spf/AD+K/U+igD8sP+G/f2qv+kSf7Z//AIXP7KX/AM/ij/hv39qr/pEn+2f/AOFz+yl/8/iv1PooA/LD/hv39qr/AKRJ/tn/APhc/spf/P4o/wCG/f2qv+kSf7Z//hc/spf/AD+K/U+igD8sP+G/f2qv+kSf7Z//AIXP7KX/AM/imt+35+1ScZ/4JJ/toEc8f8Jz+ymc8YwQPjx0569uozX6o0jZxxjPvnjv2/xFAH8o3iX/AIKnft1/s1fHnRfhV8OP2Qv2rf2mpvGniGW51D9l74reIf2d/F/xr+HOm6ncteXF7oPxV+CPxD8VX/h3wvp4k8qws/jr4TEFlYeTBD4p8tFkX+pDwRrus+JvB/hXxF4h8Kal4E17XfD2kavrPgnWbzTdR1fwnqmoWFvd33hzU7/Rrm80m8v9FuZZbC6utNurixnmgeS2meJkZsjwL8Kfhp8M38Qz/D7wF4U8G3Xi/XNQ8TeK73w/olhpuo+Jtf1S6lvNQ1nxDqNtCl7rGpXNzPJI91qNxcygN5UbLEqovxZ4Y/am+M+r6/8ADPStQ8NfC2K28YftofHT9nLW57GfxeZrXwH8KtO+IF1oviHSFn/dHxjq8/gSRNUtb1jolvDfD7IWkt2VgD9FKKReg6/j1/HpRQBi+JbDWNU8Oa/pnh7XD4Y1/UdE1Ww0PxKNOttYPh7WLyxnt9N1waRevHZ6qdJvZIL8addyJbXxt/s07rFK7D8H5/8AglR/wUm8bajNP8Vv+C6P7Vr6eb2a5i0/4O/Cn4O/B6HZJkJGreHtGe/hhjBBS1m1S/jVxuEp4x+/dFAH8+bf8EB7PX4pE+JP/BUb/gqp8QHuZGlvPtP7W/jzQ7O4dwoYDTNK1AadbIdgIjtbeFB1AzyUsP8Ag3B/Y5h8xtX+P/7efiKecsbi51T9rv4rG4nZx87ySW+rxZeU8zEhlk4G0V/QbRQB/Ps//BtP/wAE57uOCPWNd/a31xYJHlX+0/2r/i9MN7jaxUDXVWMlflYoAzDgsasWX/Bsx/wSltZGmm+H3xn1KZyxeXU/2hPildySbyCxlZ9dzLISMmZyZSWY7wTX9ANFAH4OQ/8ABtZ/wSFXP2/9nbX9bBfzGXXPi58TNSV3wRl1l8SgMcEgkjcRwSQSD32if8G8n/BHHREjRP2HPhVqYjYuP7dGt6xlmGCX+26pIJD/AL4OMnGMkH9paKAPzq8C/wDBI3/gmT8NZ4brwV+w1+zbotzbqiRXH/CtNB1GVVTGAW1S3vMjIB2nKkgEjgV9teD/AIX/AA2+HlrHZeAPh/4I8E2kQVUtvCfhXQ/D0Kqq7FATSbG1B2oAgzztGMgYA7uigBAP89vw+v4+nQV+XH/Ban/lGB+1l/2Kvgr/ANWv4Cr9SK/M7/gsT4f8QeLP+CbH7U3h7wtoWs+Jtf1Hwv4Oj07QvD+mXmsaxqEkPxQ8D3Msdjpunw3F5dPFbwTTyJDC7RwQyyuFjRmAB+lsX+rX/dT/ANAWpKiizsjHIJjUkY77VHrkYwRjrn0xUtABRRRQAUUUUAFFFFABRRRQAV8+aR+yx8BdC+J7/GLSvh7ZWvj1vEGveLotQOseJJ9GsPGPiq1uLHxT400jwdcaxL4M0bxn4lsbqey1/wAWaVoFnr+rWk0tvfahPFLIr/QdFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAYHp7/j60UUUAFFFFABRRRQAUUUUAFFFFABRRRQBxHxJ+I/gz4Q+AvFfxO+Ims/8ACPeB/BGi3fiHxRrf9narq39l6PYoHurz+zdDsdT1e98pSD9n06wu7p+kcDniiiivzDjvjXNOGMfgcLgKGArU8Tgp4mo8XSrzmpxxMqKUHSxFFKPKk2nFvm1vbQ/tn6L/ANG/gfxr4V4mzzinNOKMBi8m4joZRhaeQ4zK8Nh6mGq5NRzGU68cdlOY1JVlWqOKlCpTh7JJOm5Xm//Z




24. В каком направлении включается внешний источник питания, если фотодиод работает в фотодиодном режиме?




25. Какая из выходных характеристик соответствует схеме включения транзистора с ОБ



26. В чем преимущество 2-х тактных схем выпрямления по сравнению с 1 - тактными




27. Сколько вентилей 1-ф, 2-х тактного выпрямителя на тиристорах



Понравился тест? Оцените его

Обсуждения

Подпишись на Путь к знаниям

Здесь ты найдёшь уроки, исследования, интересные факты и вдохновение для творчества.

Подписаться!