题目内容
20.设实数x,y满足$\left\{{\begin{array}{l}{y≤2x+2}\\{x+y-2≥0}\\{x≤2}\end{array}}\right.$,则$\frac{x+y-1}{x+3}$的取值范围是$[\frac{1}{5},\frac{7}{5}]$.分析 作出不等式组对应的平面区域,利用分式函数的性质,转化为两点间的斜率,利用数形结合进行求解即可.
解答 
解:作出不等式组对应的平面区域,$\frac{x+y-1}{x+3}$=$\frac{x+3+y-4}{x+3}$=1+$\frac{y-4}{x+3}$,
则$\frac{y-4}{x+3}$的几何意义是区域内的点到定点D(-3,4)的斜率,
由图象得AD的斜率最大,CD的斜率最小,
由$\left\{\begin{array}{l}{x=2}\\{y=2x+2}\end{array}\right.$得$\left\{\begin{array}{l}{x=2}\\{y=6}\end{array}\right.$,即A(2,6),
由$\left\{\begin{array}{l}{x=2}\\{x+y-2=0}\end{array}\right.$得$\left\{\begin{array}{l}{x=2}\\{y=0}\end{array}\right.$,即C(2,0),
则AD的斜率k=$\frac{6-4}{2+3}$=$\frac{2}{5}$,CD的斜率k=$\frac{0-4}{2+3}$=$-\frac{4}{5}$,
即$-\frac{4}{5}$≤$\frac{y-4}{x+3}$≤$\frac{2}{5}$,$\frac{1}{5}$≤1+$\frac{y-4}{x+3}$≤$\frac{7}{5}$,
即$\frac{x+y-1}{x+3}$的取值范围是$[\frac{1}{5},\frac{7}{5}]$,
故答案为:$[\frac{1}{5},\frac{7}{5}]$.
点评 本题主要考查线性规划的应用,利用分式的性质,转化为直线斜率是解决本题的关键.注意利用数形结合的数学思想进行求解.
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