Сообщение Re[2]: Почему связи между O и H в H2O под углом? от 02.10.2022 11:51
Изменено 02.10.2022 12:28 Эйнсток Файр
Re[2]: Почему связи между O и H в H2O под углом?
vsb> Можно подумать, кто-то там транспортиром их мерял, углы эти. Насчитали в каких-нибудь трёхэтажных формулах чего-то и всё, а сколько там в реальности — никто не знает.
Вот это интересно.
Так-то вообще говоря, отдельные атомы видно под электронным микроскопом.
Но проверяли ли конкретно у воды?
«Существуют три вида древних электронных микроскопов.
В 1930-х годах был изобретен обычный просвечивающий электронный микроскоп (ОПЭМ),
в 1950-х годах — растровый (сканирующий) электронный микроскоп (РЭМ), а
в 1980-х годах — растровый туннельный микроскоп (РТМ).
в 90-х годах прошлого века был создан сканирующий зондовый микроскоп, более мощный чем электронный,
способный проводить исследования на уровне атомов.
Атомно-силовая микроскопия была разработана Г. Биннигом и Г. Рорером,
которым за эти исследования в 1986 была присуждена Нобелевская премия.»
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)
Разрешающая способность атомно-силового микроскопа
составляет примерно 0,1-1 нм по горизонтали и 0,01 нм по вертикали.
«с помощью сканирующего туннельного микроскопа на металлической пластине удалось наблюдать кластеры воды -гексамеры — шесть соединенных между собой молекул воды. (при температуре 5 градусов Кельвина)»
![](data:image/webp;base64,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)
Шесть молекул — это 18 атомов. И атомы-то на этой картинке не видно...
Вот это интересно.
Так-то вообще говоря, отдельные атомы видно под электронным микроскопом.
Но проверяли ли конкретно у воды?
«Существуют три вида древних электронных микроскопов.
В 1930-х годах был изобретен обычный просвечивающий электронный микроскоп (ОПЭМ),
в 1950-х годах — растровый (сканирующий) электронный микроскоп (РЭМ), а
в 1980-х годах — растровый туннельный микроскоп (РТМ).
в 90-х годах прошлого века был создан сканирующий зондовый микроскоп, более мощный чем электронный,
способный проводить исследования на уровне атомов.
Атомно-силовая микроскопия была разработана Г. Биннигом и Г. Рорером,
которым за эти исследования в 1986 была присуждена Нобелевская премия.»
Разрешающая способность атомно-силового микроскопа
составляет примерно 0,1-1 нм по горизонтали и 0,01 нм по вертикали.
«с помощью сканирующего туннельного микроскопа на металлической пластине удалось наблюдать кластеры воды -гексамеры — шесть соединенных между собой молекул воды. (при температуре 5 градусов Кельвина)»
Шесть молекул — это 18 атомов. И атомы-то на этой картинке не видно...
Re[2]: Почему связи между O и H в H2O под углом?
vsb> Можно подумать, кто-то там транспортиром их мерял, углы эти. Насчитали в каких-нибудь трёхэтажных формулах чего-то и всё, а сколько там в реальности — никто не знает.
Вот это интересно.
Так-то вообще говоря, отдельные атомы видно под электронным микроскопом.
Но проверяли ли конкретно у воды?
«Существуют три вида древних электронных микроскопов.
В 1930-х годах был изобретен обычный просвечивающий электронный микроскоп (ОПЭМ),
в 1950-х годах — растровый (сканирующий) электронный микроскоп (РЭМ), а
в 1980-х годах — растровый туннельный микроскоп (РТМ).
в 90-х годах прошлого века был создан сканирующий зондовый микроскоп, более мощный чем электронный,
способный проводить исследования на уровне атомов.
Атомно-силовая микроскопия была разработана Г. Биннигом и Г. Рорером,
которым за эти исследования в 1986 была присуждена Нобелевская премия.»
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)
Разрешающая способность атомно-силового микроскопа
составляет примерно 0,1-1 нм по горизонтали и 0,01 нм по вертикали.
«с помощью сканирующего туннельного микроскопа на металлической пластине удалось наблюдать кластеры воды -гексамеры — шесть соединенных между собой молекул воды. (при температуре 5 градусов Кельвина)»
![](data:image/webp;base64,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)
Шесть молекул — это 18 атомов. И атомы-то на этой картинке не видно...
2012-ый год, http://www.sciencemag.org/content/337/6100/1326
«учёные значительно увеличили разрешение атомно-силового микроскопа (АСМ), хотя работает он на прежнем принципе.
На конце чувствительной головки АСМ помещена отдельная молекула угарного газа (CO), которая раскачивается над сканируемой поверхностью.
При приближении к «чужим» атомам наша молекула испытывает силы притяжения и слегка меняет амплитуду покачиваний.
Замеряя изменения в амплитуде, АСМ рисует изображение сканируемой поверхности с разрешением
3 пикометра (3 × 10-12 м), что чуть больше 1/100 от диаметра атома углерода.»
Вот это интересно.
Так-то вообще говоря, отдельные атомы видно под электронным микроскопом.
Но проверяли ли конкретно у воды?
«Существуют три вида древних электронных микроскопов.
В 1930-х годах был изобретен обычный просвечивающий электронный микроскоп (ОПЭМ),
в 1950-х годах — растровый (сканирующий) электронный микроскоп (РЭМ), а
в 1980-х годах — растровый туннельный микроскоп (РТМ).
в 90-х годах прошлого века был создан сканирующий зондовый микроскоп, более мощный чем электронный,
способный проводить исследования на уровне атомов.
Атомно-силовая микроскопия была разработана Г. Биннигом и Г. Рорером,
которым за эти исследования в 1986 была присуждена Нобелевская премия.»
Разрешающая способность атомно-силового микроскопа
составляет примерно 0,1-1 нм по горизонтали и 0,01 нм по вертикали.
«с помощью сканирующего туннельного микроскопа на металлической пластине удалось наблюдать кластеры воды -гексамеры — шесть соединенных между собой молекул воды. (при температуре 5 градусов Кельвина)»
Шесть молекул — это 18 атомов. И атомы-то на этой картинке не видно...
2012-ый год, http://www.sciencemag.org/content/337/6100/1326
«учёные значительно увеличили разрешение атомно-силового микроскопа (АСМ), хотя работает он на прежнем принципе.
На конце чувствительной головки АСМ помещена отдельная молекула угарного газа (CO), которая раскачивается над сканируемой поверхностью.
При приближении к «чужим» атомам наша молекула испытывает силы притяжения и слегка меняет амплитуду покачиваний.
Замеряя изменения в амплитуде, АСМ рисует изображение сканируемой поверхности с разрешением
3 пикометра (3 × 10-12 м), что чуть больше 1/100 от диаметра атома углерода.»