Анастасия (Все сообщения пользователя)

Добрый день! Помогите, пожалуйста, рассчитать прогнозный индекс на май 2025 г. Каким образом они вообще рассчитываются? Никогда ранее не сталкивалась и не умею этого делать. Где посмотреть, как посчитать, какими нормативными документами пользоваться?

обратила внимание. Сравниваемые расценки ни те указала. Интересуют ГЭСН27-04-001-01 и с ГЭСН27-04-005 по ГЭСН27-04-007

Состав работ одинаковый. Поэтому я и не могу понять отличие. В каких случаях применяется какая расценка?

Добрый день! Подскажите, пожалуйста, различие расценок 27-04-001-01 и 27-04-005... 27-04-007? Учтена ли расклинка расценкой 27-07-001-01?

Добрый день! В связи с внесением в проектную документацию дополнительных объемов работ необходимо пройти повторную экспертизу. Подскажите, пожалуйста, каким образом вносить изменения в сметную документацию? Делать изм. к смете или же делать искл. и доп. работы? Какими документами при этом руководствоваться?
Согласно Приказу Минстроя от 4 августа 2020 г. N 421/пр раздел XI п.186 и п.188 я выбрала второй вариант. Однако эксперт утверждает, что необходимо делать не +/-, а просто изм. (Со слов эксперта "Потому что у нас не достоверность определения сметной стоимости, а проверка сметных нормативов")
Подскажите, пожалуйста, кто всё-таки прав и на какие документы опираться.

Хотелось бы узнать как правильно)
Решила всё-таки сделать доп. работы в БИМ, т.к. в некоторых позициях корректируется объем, а утвержденные расценки мы менять не можем. Мне кажется это логично. Поэтому сделаю так.

Проходим повторную экспертизу (изменения проектных решений).
Смета составлена в БИМ (по состоянию на 3 квартал 2023 г.).
Согласно п.9 Методики «Сметная стоимость строительства определяется в уровне цен, сложившемся ко времени составления сметной документации»
Согласно п.188 Методики «При внесении изменений в сметную документацию разрабатывается сводный сметный расчет, определяющий общую сметную стоимость строительства с учетом произведенных изменений проектной и (или) иной технической документации на полный объем работ с учетом объемов корректировки (исключаемых и дополнительных)... Локальные сметные расчеты (сметы) разрабатываются отдельно на исключаемые и дополнительные объемы работ»
На сегодняшний день БИМ отменили, используется РИМ (3 квартал 2024 г.).
Соответственно возникает вопрос каким методом рассчитывать дополнительные работы? Если в РИМ, то каким образом составлять ССРСС, если утвержденные и исключаемые работы будут в БИМ, а дополнительные в РИМ. Или же дополнительные работы тоже считать в БИМ и не будет ли это ошибкой?

Добрый день! Подскажите, пожалуйста, какую расценку можно применить на Выкапывание деревьев диаметром ствола менее 20 см с сохранением корневой системы?

Здравствуйте. Какую расценку будет правильнее подобрать на устройство деформационного шва бетонирования с заполнением герметиком и полипропиленовым шнуром

[QUOTE]Александр пишет:
На своей практике встречался с таким, выхода два: 1 - через КАЦ провести, в п.п. 23.1   421/пр  . указано как формируется шифр в КАЦе, к тому же если у вас счет на работы то согласно тому же пр. 421, можно использовать его одного для обоснования без 2х других))[IMG WIDTH=884 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[/IMG]2 - это отнести затраты в 9 главу как "прочие" Тут в зависимости кто будет ответственность будет нести. Если стоимость закладывать в СМР то обязательства по этим работам перекладывается на подрядчиков, а если в прочее то на заказчика что реже делается, обычно подрядчик нанимает субподрядчика на эти работы) [/QUOTE]
А какой КСР указывать на работы? К примеру, в моем случае окраска видеокамер - 13-03-03-00. Это правильно будет?

А какой КСР указывать на работы? К примеру, в моем случае окраска видеокамер - 13-03-03-00. Это правильно будет?

Спасибо всем за ответы, буду думать

Добрый день! Впервые столкнулась с данной проблемой. Необходимо в смете отобразить работы по рыночной стоимости на основании КП (окраска видеокамер). Заказчик просит, чтобы в смете была стоимость именно по КП. Какой шифр применить? Как правильно отобразить?
P.S. это смета в дальнейшем будет проходить экспертизу.

Добрый день!
Никак не могу разобраться с ведомостью объемов земляных масс. Впервые с ней сталкиваюсь. Запуталась уже окончательно.
Помогите, пожалуйста, разобраться с составом и объемом работ.
Файл во вложении