y=sin^2x+2sinxcosx+3cos^2x
=1/2(1-cos2x)+sin2x+3/2(1+cos2x)
=sin2x+cos2x+2
=√2(√2/2sin2x+√2/2cos2x)+2
=√2sin(2x+π/4)+2
(1)由2kπ-π/2≤2x+π/4≤2kπ+π/2.k∈Z
得kπ-3π/8≤x≤kπ+π/8.k∈Z
∴f(x)的递增区间为[kπ-3π/8,kπ+π/8].k∈Z
(2)
当2x+π/4=2kπ+π/2,即x=kπ+π/8.k∈Z时
f(x)取得最大值2+√2
(3)
由2x+π/4=kπ+π/2,
得f(x)的对称轴方程x=1/2kπ+π/8.k∈Z
由2x+π/4=kπ,得x=1/2kπ-π/8.
∴f(x0对称中心坐标为(1/2kπ-π/8.,0),k∈Z
y=sinx^2+2sinxcosx+3cosx^2
=(1-cos2x)/2+sin2x+3(1+cos2x)/2
=2+cos2x+sin2x=sqrt(2)sin(2x+π/4)+2
1
单调增区间:2kπ-π/2≤2x+π/4≤2kπ+π/2,即:kπ-3π/8≤x≤kπ+π/8(k为整数)
单调减区间:2kπ+π/2≤2x+π/4≤2kπ+3π/2,即:kπ+π/8≤x≤kπ+5π/8(k为整数)
2
当2x+π/4=2kπ+π/2,即x=kπ+π/8(k为整数)时,函数取得最大值:2+sqrt(2)
3
对称轴:2x+π/4=kπ+π/2,即x=kπ/2+π/8(k为整数)
对称中心:2x+π/4=kπ,即x=kπ/2-π/8(k为整数)
所以对称中心:(kπ/2-π/8(k为整数),0)
y=sin²x+cos²x+2sinxcosx+2cos²x
=1+sin2x+cos2x+1
=sin2x+cos2x+2
=√2sin(2x+π/4)+2
(1)递增区间:
-π/2+2kπ<2x+π/4<π/2+2kπ
-3π/4+2kπ<2x<π/4+2kπ
-3π/8+kπ
(2)当2x+π/4=π/2+2kπ,即:x=π/8+kπ,k∈Z时,
sin(2x+π/4)=1,此时该函数有最大值,为2+√2
(3)对称轴:2x+π/4=π/2+kπ
得对称轴为:x=π/8+kπ/2,k∈Z
对称中心:2x+π/4=+kπ
得对称中心为:(-π/8+kπ/2,0)k∈Z
祝你开心!希望能帮到你,如果不懂,请追问,祝学习进步!O(∩_∩)O
y=sin^2x+2sinxcosx+3cos^2x
=1/2(1-cos2x)+sin2x+3/2(1+cos2x)
=sin2x+cos2x+2
=√2(√2/2sin2x+√2/2cos2x)+2
=√2sin(2x+π/4)+2
(1)由2kπ-π/2≤2x+π/4≤2kπ+π/2.k∈Z
得kπ-3π/8≤x≤kπ+π/8.k∈Z
∴f(x)的递增区间为[kπ-3π/8,kπ+π/8].k∈Z
(2)
当2x+π/4=2kπ+π/2,即x=kπ+π/8.k∈Z时
(3)
由2x+π/4=kπ+π/2,
得f(x)的对称轴方程x=1/2kπ+π/8.k∈Z
由2x+π/4=kπ,得x=1/2kπ-π/8.
∴f(x0对称中心坐标为(1/2kπ-π/8.,0),k∈Z …………………………zz求采纳