请教!DOE中这个假设为什么不是H0有效,H1无效?
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这就是保护原有的条件,无罪推论。法律上也是这种,你们有明显的证据下,你不能定对方有罪。
而不是要群众自己证明自己无罪
换句话说,法无禁止皆可为 guiziyang 发表于 2023-2-17 13:41
这就是保护原有的条件,无罪推论。法律上也是这种,你们有明显的证据下,你不能定对方有罪。
而不是要群众 ...
可以按照我标题这样假设吗,结果会一样吗 乌龟的屁屁-龟腚 谢谢分享 {:1_180:} {:1_180:}
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