Епифаний (Все сообщения пользователя)

Выбрать дату в календареВыбрать дату в календаре

Страницы: 1
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Цитата
Anzhelika Goncharenko написал:
Просьба подробнее описать данное пожелание. Уточните, какую задачу Вы хотите решить с помощью реализации пожелания?
Данное пожелание лишь дает пользователю возможность выбора  - шкалы настраиваются независимо друг от друга и каждая к своему параметру, либо, если пользователь хочет двигать обе шкалы сразу, как сейчас, он фиксирует их связь, скажем через выпадающее меню чтоб далеко не лезть, и все двигается синхронно. Соответственно их пропорции и относительное положение запоминать к каждому инструменту - так же как запоминается какие дополнительные линии показывать на графике.  
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Зарегистрируйте. Чтоб было с фиксацией и без фиксации связи с правым параметром. Будет неплохо
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Если левая шкала никак не связана с правой то почему её масштаб не меняется мышкой таким же способом как и у правой. И параметр не двигается выше-ниже.
Заметки, история сделок, пожелание
 
Да хоть бы и отдельный локальный файл как конфигурация. Из него бы подтягивались заметки к инструменту. Все же лучше чем ничего.
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
картинка испортилась. должна быть такая
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Цитата
Anzhelika Belokur написал:
Правильно понимаем, что настройка "Процентное изменение" во вкладке "Дополнительно" не решает Вашу задачу? (См. Рис.2 и Рис.3) с изменением масштаба графика на другую шкалу (См. Рис.2 ) Тогда уточните, относительно какой цены параметра должно считаться изменение в %?
совершенно верно. Она переключает единственную шкалу инструмента и не позволяет сделать вторую. Приходится добавлять тот-же инструмент и вторую шкалу выставлять уже ему.
В идеале должно считаться относительно цены открытия чтобы исключить ночной гэп. Но если это невозможно, тогда, как сейчас - относительно цены закрытия. Это будет 0 отметкой процентной шкалы. Она должна совпадать с соответствующей ценой на противоположной шкале пунктов.
Цитата
Anzhelika Belokur написал:
На один график можно добавить сколько угодно параметров нажатием ПКМ по графику "Добавить график (индикатор) (См. Рис.1) Главное при выборе убрать галочку  "Поместить график в новую область", тогда все параметры  будут  в одной области.
Попробовал добавить "% изменение закрытия" тоже не совпадает и за текущий день почему-то не отображается. Всего-то из-за второй шкалы приходится вытаскивать еще один параметр. [img]data:image/png;base64,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[/img]
0 по левой шкале тут должен быть напротив 7,07 правой - такая вчера была цена закрытия
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Цитата
Anzhelika Belokur написал:
ее можно поменять/посмотреть  в настройках графика (Ctrl+E) /Область/левая шкала максимум и минимум (См. Рис)
Можно, но это значения выставленные автоматически. При смене инструмента они будут другие, по этому настраивать их вручную каждый раз не вариант.
Цитата
Anzhelika Belokur написал:
Не совсем поняли Ваш вопрос, возможно Вы имели ввиду как сделать другую шкалу по другому параметру. Это можно настроить (Ctrl+E) /Область/Параметр, например % измен.закр.)/ Свойства/ Масштаб графика: по левой или по правой шкале (См. Снимок)
Шкала измерения одного и того-же параметра - цены, только в других единицах. Одна шкала в пунктах, а другая в процентах.  
Рис.1 Цена закрытия 124,5 В процентах это 0 отметка шкалы. 10% это 136,95. Почему у программы вызывает сложности пересчитать дальше пункты в проценты? и расположить метки процентов относительно соответствующих пунктов?

Не совсем понятно как вы вытащили одновременно % изменен закр, Price и какую-то цену.  
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
С чего бы меняться масштабу если на графике один и тот же инструмент? По идее это должен быть один инструмент но я не нашел как сделать вторую шкалу не повторяя его.
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Если отключить позицию, то становится лучше но все равно не совпадает
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 

Цена закрытия была 124,5, а 0% получается меньше 120 и соответственно разъехались графики цены. Шаг сетки "авто", но и переключение на "шаг цены инструмента" ничего не меняет.

Изменил масштаб времени - теперь 0% стал меньше 115, а должен быть на отметке 125,4


Вот если взять интервал только за сегодня, 0% улетел ниже позиции. Текущая цена в процентах, по положению не совпадает с текущей ценой.  
Процентнная вертикальная шкала на графиках, Поясните поведение процентной шкалы на графиках.
 
Делаю график по одному инструменту: Правая шкала цена, левая - процент от "цены закрытия". При изменении масштаба времени, процентная шкала меняет свой масштаб относительно цен. "Цена закрытия" не совпадает с ценой закрытия из таблицы котировок.

Цена закрытия была 450, а 0 процетов гораздо выше

Вот при другом масштабе времени, он уже считает "цену закрытия" 400.
Баг, фича или я че-то не так понимаю?
Страницы: 1
Наверх