高二数学题 急
1)a=-1,f(x)=x^2-2x+2,x属于[-5,5]
f(x)=(x-1)^2+1
当x=1时,有f(x)最小值1
|x-1|最大时,有f(x)最大值
所以x=-5时,有f(x)最大值37
2)对f(x)求导,f'(x)=2x+2a,导函数单增
若原函数为单调增函数,则在x的定义域内,f'(x)恒大于0,即f'(-5)>0,即a>=5
若原函数为单调减函数,则在x的定义域内,f'(x)恒小于0,即f'(5)<0,即a<=-5
所以a<-6或a>4
1)对f(x)化简,得f(x)=根3sinx-cosx=2sin(x-pi/6)
单增区间,即-pi/2
代入,得sin(x-π/6)=3/5
con2a=1-2(sina)^2
所以cos(2x-π/3)=1-2*(3/5)^2=7/25
18: 得出f(x)=(x-1)^2 +1
f(x)最大=f(-5)=37 f(x)最小=f(1)=1
顶点(-a , 2-a^2) 单调增 -a>5 单调减 -a<-5
18题解答:
(1)f(x)=x^2-2x+2=(x-1)^2+1
当x=1时,最小值1,当x=-5时,最大值37
(2)对称轴x=-a.那么
-a<=-5或者-a>=5,解得 a>=5或者a<=-5
19题解答:
(1)f(x)=2sin(x+π/6)-2cosx
=根号3sinx+cosx-2cosx
=根号3sinx-cosx
=2sin(x-π/6)
单调递增:2kπ-π/2<=x-π/6<=2kπ+π/2
解得 :2kπ-π/3<=x<=2kπ+2π/3(k是整数)
(2)由(1)得到2sin(x-π/6)=6/5
从而 sin(x-π/6)=3/5
cos(2x-π/3)=1-2sin(x-π/6)^2=7/25
OK.
