作业帮y=(x2-2x+5)/(x-1) x属于[2,4]的最小值
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y=(x2-2x+5)/(x-1) x属于[2,4]的最小值
y=(x2-2x+5)/(x-1) x属于[2,4]的最小值
y=(x2-2x+5)/(x-1) x属于[2,4]的最小值
最小值为4 X=3时取到
y=(x^2-2x+5)/(x-1)
y'=[2(x-1)(x-1)-(x^2-2x+5)]/[(x-1)^2]
y'=(x^2-2x-3)/[(x-1)^2]
y'=(x-3)(x+1)/[(x-1)^2]
1、令:y'>0,即:(x-3)(x+1)/[(x-1)^2]>0
解得:x∈(-∞,-1)∪(3,∞)
即:x∈(-∞,-1)∪(...
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y=(x^2-2x+5)/(x-1)
y'=[2(x-1)(x-1)-(x^2-2x+5)]/[(x-1)^2]
y'=(x^2-2x-3)/[(x-1)^2]
y'=(x-3)(x+1)/[(x-1)^2]
1、令:y'>0,即:(x-3)(x+1)/[(x-1)^2]>0
解得:x∈(-∞,-1)∪(3,∞)
即:x∈(-∞,-1)∪(3,∞)时,y是单调增函数;
2、令:y'<0,即:(x-3)(x+1)/[(x-1)^2]<0
解得:x∈(-1,3)
即:x∈(-1,3)时,y是单调减函数;
考虑到x∈[2,4],有:
当x∈[2,3)时,y是单调减函数;
当x∈(3,4])时,y是单调增函数。
所以,当x=3时,有取得最小值。
最小值是:(3^2-2×3+5)/(3-1)=4
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