Това е нашия Зевс. Сменил си е името...амо какво е това Зибелт...Нещо на швабски ми звучи.
-
Вярно, че звучи швабарски, ама това е тракийското име на Бог Зевс. Ако докопаш проф. Маразов там чети, ако е интересно.
Между другого "швабарите" са идвали "на гости" преди няколко столетия. Говори се, също, че Бавария са я основали българи много отдавна.
Това ми беше при старата регистрация в сайта. Сменям за разнообразие.
![](https://data:image/jpeg;base64,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 И)
Цитат на Нака:
"Зевсе ако го беше направил този усилвател двутактен и също много хубаво ги съгласуваш двете лампи да са например в клас А. Дали ще щеше да се получи много по малко от THD=3% на пълна мощност.
А дали пък тогава (при дутактен) на 2W ще се запази този хубав/луд резултат. 0.03%"
С идеално балансиран двутакт дори ще слезе още по ниско. Но не много. Зависи от схемата, но минималните КНИ не са гаранция. Е това се заблуждават - и е вярно, и не е вярно. С у - тел с не толкова малки КНИ може да се получи далеч по добър звук от усилвател с още по малки КНИ.
Блажени са верующите.
Ти какво си мислиш - че и през двутактен ли не съм минал? Преди 22 години направих даутактен с импулсно стабилизирано захранване - клас АБ - 100 Вата синус.
Една прекрасна вечер нещо там проверявах, не помня какво - включих усилвателя с извадена едната мощна лампа - и......получих стрес....
След няколко дена обобщих резултатите. Тоест - като извадиш едната лампа се получава еднотактно стъпало, което на низка мощност работи в клас А.
....Всичко хубаво - обаче звукът БРУТАЛНО се променя. В положителна светлина.
Както казват някои - един нормален двутактен средна хубост убива тотално и най съвършенното каменно чекмедже.
Обаче еднотактният просто елиминира двутактният.
Обаче има и тънкости - това най вече е брутално за високите честоти.
Тоест - за големи мощности някои правят за баси и средни двутактни, а за високотоновия говорител Еднотактен.
Няма пълно обяснение, защо Еднотактният е безалтернативен. Мъчат се там с четните хармонични.
В къщи имам 12 вата клас А ултралинеен двутактен - на едно радио Мелодия - комунистическо производство (само цоклите са скапани, иначе си работи още). Това е 100% схемата на Marshall за китарни у - ли, само разликата е в тонкоректора. Слагам го на левия канал, а на десния еднотактното ми стъпало. Пускам от VLC моно сигнал - разликата е огромна.
На спектрограма еднотактния е малко по добър, но това е непопулярна схема с атака на втора решетка, която значително съм я усъвършенствал.
Така, че това което пишат в нета е така, ама не съвсем, щото си карат по древни стереотипи, и не щат много да движат мозъците. Но има огромен принос от единици. Така, че нещата в нета са наполовина вярни. Нормално. Нищо ново.
Та още преди 2 хилядолетия се убедих, че не е нужно да имаш чудовищна мощност от противотакт. Достатъчна е 25 Вата от еднотакт. Обаче моите български колони са с двойна чувствителност - резултатът е като от 34 вата, колоните са в ъглите на нивото на ушите, и имам и 6 Вата у - тел за псевдоквадро - което дава субективно усещане за още + 15 вата от ефекта на квадрото.
Та тъй, много време загубих с двутактните - щото за максимума изискваха и стабилизирано захранване.
УЧЕБНИЦИТЕ - КАКТО ОБИКНОВЕННО ИЗЛЪГАХА!!!)))