求f(x,y)=x² y² xy 3的极值点与极值
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x³y+2x²y²+xy³=xy(x²+2xy+y²)=xy(x+y)²=-1*2²=-4
x3y+2x2y2+xy3=xy(x2+2xy+y2)=xy(x+y)2,∵x+y=5,∴(x+y)2=25,x2+y2+2xy=25,∵x2+y2=13,∴xy=6,∴xy(x+y)2=6×25=1
原式=(x4-xy3)+(y4-x3y)+(3xy2-3x2y)=x(x3-y3)+y(y3-x3)+3xy(y-x)=(x3-y3)(x-y)-3xy(x-y)=(x-y)(x3-y3-3xy)=(
两边分别求导,得(2y)'=(-1+xy^3)'2y'=(xy^3)'2y'=x'y^3+x(y^3)'(uv)'=u'v+uv'2y'=y^3+x*3y^2*y'2y'=y^3+3xy^2*y'
这道题实际就是要把x^2+y^2变换成只由x+y和y组成的多项式x^2+y^2=x^2-y^2+2y^2=(x+y)(x-y)+2y^2=(x+y)[(x+y)-2y]+2y^2将式中(x+y)替换为
f(x+y)=f(x)+f(y)/1-f(x)f(y),则f(x)=tan(ax)怎么证明?令x=yf(2x)=f(x)+f(x)/[1-f(x)]^2tan2x=tanx+tanx/1-[tanx]
∵x+y=4,∴(x+y)2=16,∴x2+y2+2xy=16,而x2+y2=14,∴xy=1,∴x3y-2x2y2+xy3=xy(x2-2xy+y2)=14-2=12.
设a=xy,b=x+y.f(xy,x+y)=x^2+y^2+2xy-2xy=(x+y)^2-2xy把a,b带f(a,b)=b^2-2a所以f(x,y)=y^2-2x同理f(x+y,xy)=x^2+y^
x3次方y-2x2y2+xy3=xy(x²-2xy+y²)=xy(x-y)²=3x3²=27如果本题有什么不明白可以追问,再问:=xy(x2-2xy+y2)=x
方程ax^2+bx+c=0,判断这个方程有没有实数根,有几个实数根,就要用ΔΔ=b^2-4ac若Δ<0,则方程没有实数根Δ=0,则方程有两个相等实数根,也即只有一个实数根Δ>0,则方程有两个不相等的实
已知x+y=5,xy=3,代数式x3y-2x平方y平方+xy3=xy(x²-2xy+y²)=xy(x-y)²=3×[(x+y)²-4xy]=3×(25-12)=
∵|x+y+1|≥0,|xy-3|≥0|x+y+1|+|xy-3|=0,∴x+y+1=0,即x+y=-1xy=3xy3+x3y=xy(x²+y²)=yx[(x+y)²-2
x+y=4,xy=2后者平方后二式相加再加后者平方
x,y都是未知数,你也可以把他们当做t,r那么就是求f(t,r)首先由题意知2x+y=t,2y+x=r用t,r表示x,y,可得x=1/3(2t-r),y=1/3(2r-t)并将其代入f(2x+y,2y
x3y+xy3=xy(x^2+y^2)=(√3-√2)(√3+√2)((√3-√2)^2)+(√3-√2)^2)=1*(3-2√6+2+3+2√6+2)=10
(x-y)2=x2-2xy+y2=9,当x2+y2=13时,13-2xy=9,解得xy=2.当xy=2,x2+y2=13时,x3y-8x2y2+xy3=xy(x2-8xy+y2)=2×(13-8×2)
假设:X=Y/XY=X/Y带入函数就是:F(y/x,x/y)=(y/x+x/y)/(y/x—x/y)=x²+y²)/(y²-x²)希望可以帮助你!
∵x-y=l,xy=2,∴x3y-2x2y2+xy3=xy(x2-2xy+y2)=xy(x-y)2=2×1=2.
y'=f'(x+sinx)(1+cosx)y''=f''(x+sinx)(1+cosx)^2+f'(x+sinx)(1-1/1+x^2)=f"(x+sinx)(1+cosx)^2+f'(x+sinx)
错了吧,x³+y是x³yx+y=2√7xy平方差=7-3=4则(x+y)²=x²+2xy+y²=(2√7)²x²+y²=