Das Seitenverhältnis 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[/img] bezeichnet man mit:

Das Seitenverhältnis [img]data:image/png;base64,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[/img] bezeichnet man mit:

Das Seitenverhältnis 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hr4mzTgaotQVHQI21fwi+ZkYZn9vn37+LeT8AsC2BirSWvgb9KAq50NUdEhbILFBlfgdcMKAbubgnURFhYWFbfTPLUGolQDlhgpSu+kmWsN/I818C9DqosOsKUQTAAAAABJRU5ErkJggg==[/img] bezeichnet man mit

Das Seitenverhältnis [img]data:image/png;base64,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bezeichnet man mit