已知|x|≤1,|y|≤1,那么|y+1|+|2y-x-4|的最小值是________.
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3
解析分析:先得出-1≤x≤1,-1≤y≤1,从而可得出y+1≥0;2y-x-4<0,可去掉绝对值,然后得出|y+1|+|2y-x-4|=5+x-y,这样即可判断出|y+1|+|2y-x-4|的最小值.
解答:∵|x|≤1,|y|≤1,
∴-1≤x≤1,-1≤y≤1,
故可得出:y+1≥0;2y-x-4<0,
∴|y+1|+|2y-x-4|=y+1+(4+x-2y)=5+x-y,
当x取-1,y取1时取得最小值,所以|y+1|+|2y-x-4|min=5-1-1=3.
故