推荐回答(6个)
1.f(x)=f(x/2+x/2)=f²(x/2)>0
2.对。用均值不等式,因为x1≠x2,所以[f(x1)+f(x2)]=10^x1+10^x2>2根号下(10^x1 * 10^x2)=2f[(x1+x2)/2]
3.1/4^x+(2/4)^x+(3/4)^x+a<0,左边随x增大而减小,所以最大值在x=0时取得,所以1+1+1+a<0,a<-3
4.高中不要求那么严密,我就大概说了
当x=-1或1时,f(x)小于等于1/2,解得1/2小于等于a小于等于2
下面证此时成立:
x=0时显然成立
-10综上此时成立
所以a∈[1/2,1)并(1,2]
这几道题对高一有一定难度,第一道函数方程,这种类型曾是奥赛中的难题,形式简单,做法简单,却难想;第二道我不知道你们学均值不等式没,若是竞赛班,应该学了,若没学,可用完全平方式试一下;第四道形式诡异,且大多数人讨厌分类讨论,我用的是先猜后证,可能有其他方法
1 . x=y=z/2
对任意实数z,有 f(z)=f(2x)=f(x)^2 >0
2. 10^(x1/2+x2/2)<(10^(x1)+10^x2)/2
因为 10^(x1)+10^x2>=2sqrt(10^(x1)10^(x2)) a+b>=2sqrt(ab)
x1 !=x2 =>10^(x1)+10^x2>2sqrt(10^(x1)10^(x2)) ==> 10^(x1/2+x2/2)<(10^(x1)+10^x2)/2
3. 对任意x, a<-(1+2^x+3^x)/4^x, 由于(1+2^x+3^x)/4^x 是单调减小的,极大值在x=0处
为3 因此 a<-3
4 x²-a^x-1/2<0 ==> a^x>(x^2-1/2)
a>1 a>(x^2-1/2)^(1/x)
a<1 a<(x^2-1/2)^(1/x)
x定义域 sqrt(2)/2==x>=-1,(x^2-1/2)^(1/x)在这些定义域中分别是单调函数
且取值为(0,1/2), (2,+inf)
因此找不到这样的a满足要求,或者,满足条件的a的值域为空集
1. 第一题很简单
f(x+y)=f(x)*f(y),当x=y时,f(2x)=f(x)^2>=0,因为f(x)不恒为零,所以f(2x)=f(x)^2>0;
这里f(x)和f(2x)的定义域都一样(都在自然数集合里),只是在同一尺度下的放缩变换导致取值不同,所以不影响f(x)的值域范围。因此很容易看出f(x)>0
2. 为了简单点。先进行一下等价变换
a=10^(x1/2);
b=10^(x2/2);
由此可以把上述不等式化简为:
a*b<(a^2+b^2)/2
即a^2-2a*b+b^2>=0,因为x1和x2不相等所以a和b也不会相等。
公因式变换为(a-b)^2>0
4.f(x)=x^2-a^x代入不等式,可得
x^2-a^x<1/2
化简得到
2x^2-1<2a^x
因为x定义域在(-1,1)可以很方便求出
-1<2*x^2-1<1
2(1/a)<2a^x<2a
那么a必须满足2a>1,且2(1/a)>-1,还有a不等于1
所以联立不等式2>a>0.5,且a!=1
1令x,y都等于0,则f(0)的平方=f(0),又因为f(x)不为0,所以f(0)=1,对此,我们取f(x)=f(x/2)f(x/2)=[f(x/2)]^2,因此,对于任意的x,都有f(2)大于等于0,而显然,根据题意f(2)是不可以为0的,所以f(x)>0
2 f[(x1+x2)/2]=10^[(x1+x2)/2]=根号下[10^(x1+x2)],显然是小于【10^(x1)+10^(x2)】/2的,运用一下三角不等式a^2+b^2>=2ab就可以了,而指数函数是不可能等于0,只是无限趋近于0,因此等于号久可以拿掉了,提供思路,证明不证了
3,4两题诶,对数的公式什么的都忘记光了。。。算的头大。帮不上忙了,不好意思
各位仁兄帮忙看下几道数学题 十分感激!! 我来回答得简单点吧 由立方和公式: x^3/2 x^(-3/2) =(x^1/2 x^-1/2)(x x^-1-1) =
1,设X=X/2,Y=X/2,根据f(x+y)=f(x)f(y)得,f(x)=f(x/2)f(x/2)=f(x/2)^2>=0,又因为f(x)恒不为0,所以f(x)>0。。。。
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