И так я задавал один и тот же вопрос 4 админам кароса их ответы меня поразили
вот вопрос который я задавал
И так вопрос есть много скилов которые уменьшают скорость атаки на 100% , вот почему с учетом того у персонажа скорость должна быть скорость атаки 0, он может бить ?
Лол,скилыи автоатака - разные вещи. Вот потрох не бьет маг. атакой, но на скилы его же не распростроняется скорость атаки.Имхо, твой вопрос не имеет смысла.но фишка в том что авто атака работает
В теории он не сможет бить автоатакой.
Но это если у персонажа СА 100% и меньше. Это лишь теория, а на эксперименты времени нет.
скилыписал Я понялТы считал не правильно, они стакаются по другому. Например, имеем 2.00 СА.
Скиллснимает 70%, остается 0,6. Другой скилл снимает 50%, но это уже не 120%, а 70 и 50 от оставшихся 30. То есть 50% от 0,6.Ой ошибся, забыл, СА же не в % измеряется. Наверно это работает как с уменьшением
критуроном, т.е минимум остается.Мне вообще порой кажется, что они сами не в курсе этих значений. Либо им просто лень читать инструкцию по Каросу от "корейцев" либо им просто эту инфу не дали.Дабы не перегружать и без того замученные "нарзаном" умственные способности![](/media/sm/haha.png)
Складывать проценты, когда их нужно умножать... :facepalm:
гайдов, в которых упоминалсякачврейтыпод стабами проценты от всего этого складывалиА кстати, уменьшение в
шмотепо законам математики работает или нет?Насколько я помню, там стата указана не в процентах, а в простой десятичной дроби (уменьшить
крит. урон: 0.06), т.е. в 4 таких шмотках будет 1-0.24=0.76. Не знаю насчет зелья на 20% снижения крит урона, наверно, при его применении будет 0.8-0.24=0.56.будет 0.8-0.24=0.56.
То есть 0,8 * 0,76
В ру карос уже давно не заходил, в америку играю. Че это за статки такие? Можешь
скриншотсделать?Насчет 2 ответа - это было чисто мое предположение. Получается, чем больше у тебя
крит. сопротивление, тем хуже эффект зелья?Сейчас
скринкинушмотас % уменьшения. Ты не прав, я игралсиномв 93сетебыло у меня 22% уменьшения и когда я решил сравнить ссетом0.24 уменьшения, то % намного эффективние снижают критические удары.![](data:image/jpeg;base64,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)
Ну значит математика вместе с ее законами здесь бессильнаСтата на уменьшение критического урона снижает сам критический урон, прошедший по тебе, а снижение силы
крита, снижает саму стату(урон от крита) у противника.