作业帮已知2x 3y=m 3x 5y=m 2的解满足x y=12
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∵m2+m-1=0,∴m2+m=1.∴原式=m(m2+m+m)-2005=m2+m-2005=1-2005=-2004.
∵m3+2m2+2005=m3+m2+m2+2005=m(m2+m)+m2+2005①,又∵m2+m-1=0,∴m2+m=1②,将②代入①得,原式=m(m2+m)+m2+2005=m+m2+2005③
将两式相加可得M2-N2=2,两式相减M2-2MN+N2=14
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)=(
原式=4x29y2•27y364x3•4xy=34x2.故答案为34x2.
∵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.
(2x4-4x3y-x2y2)-2(x4-2x3y-y3)+x2y2=2x4-4x3y-x2y2-2x4+4x3y+2y3+x2y2=2y3,因为化简的结果中不含x,所以原式的值与x值无关.
已知m2-mn=21.mn-n2=-15两式相减得:m2-2mn+n2=36再问:m后面是2次方。n后面也是2次方再答:是的已知m^2-mn=21.mn-n^2=-15两式相减得:m^2-2mn+n^
∵m²+2m+1=0∴m=-1∴m³+2m²+3m=-2
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
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)
∵x+y=3,∴(x+y)2=9,即x2+y2+2xy=9①,又x2+y2-3xy=4②,①-②,得5xy=5,xy=1.∴x2+y2=4+3xy=7.∴x3y+xy3=xy(x2+y2)=7.故答案
∵m2-mn=7,mn-n2=-2,∴m2-n2=(m2-mn)+(mn-n2)=7+2=9;m2-2mn+n2=(m2-mn)-(mn-n2)=7-2=5.
∵x-y=l,xy=2,∴x3y-2x2y2+xy3=xy(x2-2xy+y2)=xy(x-y)2=2×1=2.
∵m^2-mn=21、mn-n^2=15,∴两式相减,得:m^2-2mn+n^2=21-15=6.
∵m2+m-1=0,∴m2+m=1,∴m3+2m2+2013,=m(m2+m)+m2+2013,=m2+m+2013,=1+2013,=2014.故答案为:2014.