7.若關(guān)于x的不等式$\frac{(k-1){x}^{2}+(k-1)x+2}{{x}^{2}-x+1}$>0的解集是R,求實數(shù)k的取值范圍.
分析 先判斷分母恒為正����,將不等式進(jìn)行轉(zhuǎn)化�����,結(jié)合一元二次不等式的性質(zhì)進(jìn)行求解即可.
解答 解:∵x2-x+1>0恒成立,
∴不等式式$\frac{(k-1){x}^{2}+(k-1)x+2}{{x}^{2}-x+1}$>0等價為(k-1)x2+(k-1)x+2>0恒成立����,
若k=1,則不等式等價為2>0����,滿足條件.
若k≠1,則要使不等式恒成立�,則滿足$\left\{\begin{array}{l}{k-1>0}\\{△=(k-1)^{2}-8(k-1)<0}\end{array}\right.$�����,
即$\left\{\begin{array}{l}{k>1}\\{(k-1)(k-9)<0}\end{array}\right.$�,即$\left\{\begin{array}{l}{k>1}\\{1<k<9}\end{array}\right.$����,
解得1<k<9��,
綜上1≤k<9,
即實數(shù)k的取值范圍是[1,9).
點評 本題主要考查不等式的求解�,將不等式轉(zhuǎn)化為一元二次不等式是解決本題的關(guān)鍵.
