Написать функцию на js для создания обводки в svg
Цена договорная
Добрый день! Ищем разработчика, который на javascript напишет функцию для формирования обводки заданной толщины внутри контура svg (не выходящей за границы черного элемента на картинке-примере внизу). Обводка должны быть не stroke типа, а как "заливка". На изображении ниже показан пример. Слева - svg "до", справа svg "после".
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)
Пример svg для тестирования функции: https://dropmefiles.com/Z6hfs
Пример svg для тестирования функции: https://dropmefiles.com/Z6hfs
В заказе есть исполнитель
При переводе заказа из архивного в актуальный, текущий исполнитель будет снят с задачи.
Выберите тип сделки
С безопасной сделкой вы всегда сможете вернуть средства, если что-то пойдет не так. С простой сделкой вы самостоятельно договариваетесь с исполнителем об оплате и берете на себя решение конфликтов.