π 2[f(sinx)](π,0)=π[f(sinx)](π 2,0)

补充楼上的回答∫[0,π/2]f(sinx,cosx)dxx=π/2-ux=0,u=π/2,x=π/2,u=0=∫[π/2,0]f(sin(π/2-u),cos(π/2-u))d(π/2-u)=-∫[

算嘛再答：再问：额，这样额再问：再问：那如果是这样的也是算？再答：你那是大几的题目啊再问：大一额再答：问你们数学老师去

定义法f(x+π/2)=|sin(x+π/2)+cos(x+π/2)|+|sin(x+π/2)-cos(x+π/2)|=|cosx-sinx|+|cosx+sinx|=f(x)所以,π/2是函数f(x

I=∫[0,π/2]f(cosx)dx换元,令u=π/2-x,dx=(﹣1)du=∫[π/2,0]f(sinu)(-1)du=∫[0,π/2]f(sinu)du=∫[0,π/2]f(sinx)dx

1.f(x)=1/2cos2x+√3/2sin2x+cos^2x-sin^2x=3/2cos2x+√3/2sin2x=√3sin(2x+π/3)2.x属于【-π/12,π/2】,所以2x+π/3属于【

如图

∫(0~π)f(x)sinxdx=∫(0~π)f(x)d(-cosx)=-f(x)*cosx|(0~π)+∫(0~π)cosxdf(x)=-[(f(π)*-1)-(f(0)*cos(0))]+∫(0~

∫(上π,下π/2)xf(sinx)dx=(令t=x-π/2)=∫(上π/2,下0)(t+π/2)f(sint)dt=∫(上π/2,下0)tf(sint)dt+π/2∫(上π/2,下0)f(sint)

左边=-cosπ+cos0=2右边=2(-cosπ/2+cos0)=2原式成立再问：是f(sinx),不是sinx再答：抱歉，没仔细看题呵。令x=(π/2)-t则∫(0,π/2)f(sinx)dx=∫

令t=π-x,做代换可以证明.详见参考资料

f(-sinx)+3f(sinx)=4sinxcosx即f(sin(-x))+3f(sinx)=4sinxcosx用x代替-xf(sinx)+3f(sin(-x))=4sin(-x)cos(-x)两式

设x=sinxf（-x）+3f（x）=4*x*√(1-x^2).①设x--sinxf（x）+3f（-x）=4*（-x）*√(1-x^2).②①②分别相加相减得到③④4f（x）+4f（-x）=0.③2f

f(x)=4sinx*sin^2（(π+2x）/4)+（cosx+sinx）（cosx-sinx）=4sinx*[1-cos(π/2+x)]/2+cos²x-sin²x=sinx(

证明：令x=π-t,则x由0到π,t由π到0,dx=-dt原式记为I则I=-（积分区间π到0）∫(π-t)f(sin(π-t)dt=-(积分区间π到0）∫(π-t)f(sin(t)dt=(积分区间0到

令u=π-x,du=-dx,u：π--->0,则∫[0--->π]xf(sinx)dx=-∫[π--->0](π-u)f(sin(π-u))du=∫[0--->π](π-u)f(sinu)du=π∫[

1、f(x)=sinx(sinx+√3cosx)=sin²x+√3sinxcosx=(1-cos2x)/2+(√3/2)sin2x=(√3/2)sin2x-(1/2)cos2x+1/2=si

解f(x)=2sinx(sinx+cosx)=2sin²x+2sinxcosx=sin2x-(1-2sin²x)+1=sin2x-cos2x+1=√2(√2/2sin2x-√2/2

设x=π-y,dx=-dy当x=0,y=π当x=π,y=0∫(0→π)xf(sinx)dx=-∫(π→0)(π-y)f(sin(π-y))dy=π∫(0→π)f(siny)dy-∫(0→π)yf(si

周期的意思是使得f(x+T)=f(x)的最小正值T,上式满足f(x+2π)=f(x),而f(x+π)=-f(x),所以周期是2π,不是π奇函数是满足f(-x)=-f(x)的函数,这个函数明显满足