Тестирую новую стратегию. Ищу человека который сможет помочь написать робота. С вас написание робота с меня страта + построенные экономические модели в excel(я на истории проверял, как она ведет себя, какие тп и сл оптимальны.) С середины ноября сделал 80% на реале. На истории с начала этого года чуть меньше 9900% прибыли,(комиссию учел). Макс просадка 80%, но это во флете и то больше 8 лет назад. А страта на тренд. Стратегия очень простая. 1 сделка в день. Более того, есть вариант простой оптимизации, которая дола на истории с начала года 500+%.
![Написание торгового робота Написание торгового робота](http://data:image/png;base64,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)
Но оптимизация возможна только роботом. Прибыль на истории за 5 лет (без оптимизационного решения)
8886245,256 — иксов за 5 лет.(ком. не учел. но при условии 1 сделки в день она будет не большая)
Кого заинтересовал в ЛС.
Всем хорошего профита.