已知x+y=3,x2+y2-xy=4,那么x4+y4+x3y+xy3的值为______
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∵x+y=3,x2+y2-xy=4,
∴x4+y4+x3y+xy3,
=x3(x+y)+y3(x+y),
=(x3+y3)(x+y),
=(x+y)(x2+y2-xy)(x+y),
=32×4,
=36.
故答案为:36.
∴x4+y4+x3y+xy3,
=x3(x+y)+y3(x+y),
=(x3+y3)(x+y),
=(x+y)(x2+y2-xy)(x+y),
=32×4,
=36.
故答案为:36.
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解:x+y=3 x²+y²+2xy=9 (1)
x²+y²-xy=4 (2)
(1)-(2)得 3xy=5 x²+y²=4+5/3=17/3
( x²)²+(y²)²+x³y+xy³
=(x²+y²)²-2x²y²+xy(x²+y²)
=(17/3)²-2(5/3)²+5/3·17/3
=289/9-50/9+85/9
=(289-50+85)/9
=324/9=36
∴ x4+y4+x3y+xy3=36
x²+y²-xy=4 (2)
(1)-(2)得 3xy=5 x²+y²=4+5/3=17/3
( x²)²+(y²)²+x³y+xy³
=(x²+y²)²-2x²y²+xy(x²+y²)
=(17/3)²-2(5/3)²+5/3·17/3
=289/9-50/9+85/9
=(289-50+85)/9
=324/9=36
∴ x4+y4+x3y+xy3=36
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