题目内容
19.已知f(x)=ax2+bx+1(a>0,b∈R)的最小值为-a,f(x)=0的两个实根为x1,x2,P={x|f(x)<0,x∈R}(1)求证:|x1-x2|=2;
(2)若g(x)=f(x)+2x在x∈P上存在最小值,求a的取值范围;
(3)若0<x1<2,求b的取值范围.
分析 (1)通过对f(x)=a(x-x1)(x-x2)配方可知,$(\frac{{x}_{1}-{x}_{2}}{2})^{2}$=1,进而化简即得结论;
(2)通过不妨设x1<x2,利用f(x)+2x在(x1,x2)存在最小值可知对称轴位于此区间内,进而计算即得结论;
(3)通过韦达定理可得b的表达式b=-$\frac{{x}_{1}+{x}_{2}}{{x}_{1}{x}_{2}}$,利用已知条件可知x2=x1+2,进而结合函数的单调性即得结论.
解答 (1)证明:∵f(x)=a(x-x1)(x-x2)
=a$(x-\frac{{x}_{1}+{x}_{2}}{2})^{2}$-a$(\frac{{x}_{1}-{x}_{2}}{2})^{2}$,
∴$(\frac{{x}_{1}-{x}_{2}}{2})^{2}$=1,即|x1-x2|=2;
(2)解:不妨设x1<x2,则
f(x)+2x=ax2-[a(x1+x2)-2]x+ax1x2在(x1,x2)存在最小值,
∴x1<$\frac{a({x}_{1}+{x}_{2})-2}{2a}$<x2,
由(1)可知|x1-x2|=2,a>0,
所以a>1;
(3)解:∵x1+x2=-$\frac{b}{a}$,x1x2=$\frac{1}{a}$,
∴b=-$\frac{{x}_{1}+{x}_{2}}{{x}_{1}{x}_{2}}$,
∵0<x1<2,x1x2=$\frac{1}{a}$>0,|x1-x2|=2,
∴x2=x1+2,
∴b=-$\frac{1}{{x}_{1}}$-$\frac{1}{{x}_{1}+2}$在x1∈(0,2)上为增函数,
∴b<-$\frac{3}{4}$.
点评 本题考查二次函数的性质,考查运算求解能力,注意解题方法的积累,属于中档题.
名校课堂系列答案| A. | ${A}_{5}^{5}$${A}_{6}^{4}$-2${A}_{4}^{4}$${A}_{5}^{4}$ | B. | ${A}_{5}^{5}$${A}_{4}^{4}$-${A}_{4}^{4}$${A}_{5}^{4}$ | ||
| C. | ${A}_{6}^{5}$${A}_{5}^{4}$-2${A}_{4}^{4}$${A}_{4}^{4}$ | D. | ${A}_{5}^{5}$${A}_{5}^{4}$-${A}_{4}^{4}$${A}_{4}^{4}$ |
| A. | $\frac{1}{5}$ | B. | $\frac{1}{2}$ | C. | $\frac{1}{3}$ | D. | $\frac{1}{4}$ |
| A. | -1 | B. | 0 | C. | 1 | D. | 2 |
| A. | $\frac{1}{4}$ | B. | $\frac{1}{3}$ | C. | $\frac{2}{3}$ | D. | $\frac{3}{4}$ |