MSA 中线性公式求解。
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 大佬们这个B+A*X0 与(X0-Xbar)^2 是一个意思吗,这个代表这那个数字呢没看懂 {:1_180:} 不懂 http://blog.sina.com.cn/s/blog_54b8e99b0100yalz.html 要结合图表看,才能说的清 MSA 线性里面有个95%的回归高值低值的计算公式里面 有一个X0Xi 是什么意思 {:1_180:}
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