推荐回答(4个)
答:
f(x)=a^(x+1),g(x)=log(1/a)(x)
h(x)=f(x)-g(x)=a^(x+1)-log(1/a)(x),1<=x<=2
最大值m,最小值n:
m+n=13
m-n=5
解得:m=9,n=4
1)01
f(x)是减函数,g(x)是增函数
所以:h(x)=f(x)-g(x)是减函数
x=1时,最小值h(1)=a^2-log(1/a)(1)=a^2=4,a=2不符合
2)a>1时:0<1/a<1
f(x)是增函数,g(x)是减函数
所以:h(x)=f(x)-g(x)是增函数
x=1时,最小值h(1)=a^2-log(1/a)(1)=a^2=4,a=2
x=2时,最大值h(2)=a^3-log(1/a)(2)=8-log(1/2)(2)=8+1=9
符合题意
综上所述,a=2,选择B
10。若f(x)=∣log‹a›x∣,其中0∵0log‹a›(1/3)>log‹a›(1/2)>0;
即f(1/4)>f(1/3)>f(1/2)>0;
而log‹a›2=log‹a›(1/2)⁻¹=-log‹a›(1/2)<0,f(2)=∣log‹a›2∣=∣-log‹a›(1/2)∣=log‹a›(1/2);
故f(1/4)>f(1/3)>f(2)即有f(2)11。已知f(x)=a^(x+1),g(x)=log‹1/a›x,(a>0,且a≠1);h(x)=f(x)-g(x);x∊[1,2];h(x)的最大
值与最小值之和=13;最大值与最小值之差=5,则a=?
解:h(x)=a^(x+1)-log‹1/a›x,(1≦x≦2).
由于h'(x)=[a^(x+1)]lna-1/[xln(1/a)]=[a^(x+1)]lna+1/(xlna)={[xa^(x+1)]ln²a+1}/(xlna)
的符号取决于分母上lna的符号:当01时,lna>0,此时h'(x)>0.
故不论a如何,h(x)都是单调函数:01时h(x)单调增。
当0此时a²+a³-log‹1/a›2=13..........(1) a²-a³+log‹1/a›2=5...........(2)
(1)+(2)得2a²=18,a²=9,a=3,这与前提条件0当a>1时,maxh(x)=h(2)=a³-log‹1/a›2;minh(x)=h(1)=a²;
此时a³-log‹1/a›2+a²=13..........(3); a³-log‹1/a›2-a²=5...........(4)
(3)-(2)得2a²=8,a²=4,故a=2。因此应选B.
12。已知log‹a›(1/2)<1,那么a的取值范围为?
解:log‹a›(1/2)<1=log‹a›(a)............(1)
当0当a>1,时,log‹a›x是增函数,故由不等式(1)得a>1/2;{a∣a>1}∩[a∣a>1/2} ={a∣a>1}。
故01就是a的取值范围,故应选D.
B,h(x)=a^(x+1)+loga(x),看ABCD4个选项,明显排除A,BCD都是a>1,所以h(x)单调递增,h(1)=4,解得a=2
B
由最大值最小值只差可以求出:MAX=9,MIN=4。
1、当a>1时,F(X)在[1,2]上单调增,G(X)在[1,2]上单调减,故H(X)在[1,2]上单调增。此时H(1)=4.H(2)=9可以得出a=2.
2、当0故,a=2
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