z=e^(-x)*siny

来源:学生作业帮助网 编辑:作业帮 时间:2024/11/15 21:13:42
z=e^(-x)*siny
求函数z=sinx+siny+sin(x+y)(0

z对x的偏导=cosx+cos(x+y)=0时,cosx=-cos(x+y)=cos(pi-x-y),所以x=pi-x-y.同理z对y的偏导=0时,有y=pi-x-y.所以x=y=pi/3.此时z=3

设siny-e^x+xy^2=0,求dy/dx

siny-e^x+xy^2=0cosy.y'-e^x+2xy.y'+y^2=0(cosy+2xy)y'=e^x-y^2y'=(e^x-y^2)/(cosy+2xy)

∫L(e^x siny-2y)dx+(e^x cosy-z)dy, L:上半圆周(x-a)^2+y^2=a^2 , y>

利用格林公式设P=e^xsiny-2yQ=e^xcosy-z(这儿不可能是z,是x还是2呢,先作为2来解)Q对x求偏导数=e^xcosy,P对y求偏导数=e^xcosy-2差为2不等于0连接半圆的直径

求下列导数:sin(x+y)=sinx+siny e^x+x=e^y+y

再问:大哥,你题目看错了。。。再答:哪里有错?再问:第一条等式就错了。。是sin(x+y)=sinx+siny。后面是cos(x+y)·(1+y')=cosx+cosy·y'?再答:OK,那我改下

求导 e^x/(e^x +1)dx cosy /siny dy=ln siny

求导?是求积分吧∫e^x/(e^x+1)dx=∫1/(e^x+1)d(e^x+1)=ln|e^x+1|+C,C为常数∫cosy/sinydy=∫1/sinyd(siny)=ln|siny|+C,C为常

己知sinx+siny=1/3,求z=siny—cos^2 x的最大值.

sinx+siny=1/3,sinx=1/3-sinysin²x=1/6-2siny/3+sin²yz=siny—cos^2x=siny+sin²x-1=siny+1/6

设siny+e的x次方-xy²=0,求dy/dx

dsiny+de^x-dxy²=0cosydy+e^xdx-y²dx-2xydy=0cosydy-2xydy=y²dx-e^xdxdy/dx=(y²-e^x)/

∫(e^y)siny dy=?

∫e^ysinydy=-∫e^yd(cosy)=-[e^y*cosy-∫cosyd(e^y)]=∫cosy*e^ydy-e^ycosy=∫e^yd(siny)-e^ycosy=e^ysiny-∫sin

已知x,y,z属于(0,派/2),sin^2x+sin^2y+sin^2z=1,求(sinx+siny+sinz)/(c

x,y,z属于(0,派/2)sinx,cosx∈(0,1)对于a>0,b>0,有不等式:开根号下(a^2+b^2)≥根号2*(a+b)/2sin^2x+sin^2y+sin^2z=1cosx=开根号下

siny+e^x-xy^2=0,求dy/dx

siny+e^x=xy^2,两边求微分,cosydy+e^xdx=d(xy^2)cosydy+e^xdx=y^2dx+2xydy整理,得(e^x-y^2)dx=(2xy-cosy)dydy/dx=(e

求隐函数siny+e的x次方-xy的2次方=0的导数

隐函数求导,就是先左右一起求微分,加个d,然后写出多少dx+多少dy=0,移项变成dy/dx=多少的形式就好了

证明sinx+siny+sinz-sin(x+y+z)=4sin((x+y)/2)sin((x+y)/2)sin((x+

sinx+siny+sinz-sin(x+y+z)=4sin[(x+y)/2]sin[(x+z)/2]sin[(y+z)/2]sinx+siny+sinz-sin(x+y+z)=2sin[(x+y)/

求该函数的偏导数 z=e^x siny- 3(x^3) cosy

z=e^xsiny-3(x^3)cosyzx=e^xsiny-9(x^2)cosyzy=e^xcosy+3(x^3)siny

求隐函数的偏导数siny+e^x-xy^2=0,求dy/dx

解两边求导y‘cosy+e^x-y^2-2xyy'=0即y’(cosy-2xy)=y^2-e^xy'=(y^2-e^x)/(cosy-2xy)或者F(x,y)=siny+e^x-xy^2=0Fx=e^

设z=xyf(x+y,e^x siny),其中f具有一阶连续偏导数,求Zx,Zy

偏Z比偏Y=xf(x+y,e^xsiny)+xy(f1'+f2'e^xcosy),偏Z比偏x=z=yf(x+y,e^xsiny)+xy(f1'+f2'e^xsiny).

x*e^y+siny=0 求dy/dx

x*e^y+siny=0e^y+x*e^y*y'+cosy*y'=0=>y'=-e^y/[xe^y+cosy]再问:你好!我数学太烂。。能不能补充一下完整的答案。。。再答:x*e^y+siny=0两边

已知sinx+siny+sinz=cosx+cosy+cosz=0,求tan(x+y+z)+tanxtanytanz的值

注:以下pi表示圆周率由于三角函数的周期性以及x,y,z地位的对等性,不妨设0

设siny+ex(是e的x次方)-xy=0.求dy/dx

dy/dx=(y^2-e^x)/(cosy-2xy)

设siny+e^3x-2x^3y^2=0,求dy/dx

这是隐函数的求导cosy*y'+3e^3x-6x^2y^2-4x^3*y*y'=0dy/dx=y'=(6x^2y^2-3e^3x)/(cosy-4x^3y)