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Biến đổi mỗi đa thức theo hướng làm xuất hiện thừa số x+y-2 M=x3+x2y−2x2−xy−y2+3y+x−1M=x3+x2y−2x2−xy−y2+3y+x−1
M=x3+x2y−2x2−xy−y2+(2y+y)+x−(−2+1)M=x3+x2y−2x2−xy−y2+(2y+y)+x−(−2+1)
M=(x3+x2y−2x2)−(xy+y2−2y)+(x+y−2)+1M=(x3+x2y−2x2)−(xy+y2−2y)+(x+y−2)+1
M=(x2.x+x2.y−2x2)−(x.y+y.y−2y)+(x+y−2)+1M=(x2.x+x2.y−2x2)−(x.y+y.y−2y)+(x+y−2)+1
M=x2.(x+y−2)−y.(x+y−2)+(x+y−2)+1M=x2.(x+y−2)−y.(x+y−2)+(x+y−2)+1
M=x2.0+y.0+0+1M=x2.0+y.0+0+1
M=1M=1
N=x3+x2y−2x2−xy2+x2y+2xy+2y+2x−2N=x3+x2y−2x2−xy2+x2y+2xy+2y+2x−2
N=x3+x2y−2x2−xy2+x2y+2xy+2y+2x−(−4+2)N=x3+x2y−2x2−xy2+x2y+2xy+2y+2x−(−4+2)
N=(x3+x2y−2x2)−(x2y+xy2−2xy)+(2x+2y−4)+2N=(x3+x2y−2x2)−(x2y+xy2−2xy)+(2x+2y−4)+2
N=(x2x+x2y−2x2)−(xyx+xyy−2xy)+(2x+2y−4)+2N=(x2x+x2y−2x2)−(xyx+xyy−2xy)+(2x+2y−4)+2
N=x2(x+y−2)−xy(x+y−2)+2(x+y−2)+2N=x2(x+y−2)−xy(x+y−2)+2(x+y−2)+2
N=x2.0−xy.0+2.0+2N=x2.0−xy.0+2.0+2
N=2N=2
P=x4+2x3y−2x3+x2y2−2x2y−x(x+y)+2x+3P=x4+2x3y−2x3+x2y2−2x2y−x(x+y)+2x+3
P=(x4+x3y−2x3)+(x3y+x2y2−2x2y)−(x2+xy−2x)+3P=(x4+x3y−2x3)+(x3y+x2y2−2x2y)−(x2+xy−2x)+3P=(x3x+x3y−2x3)+(x2y.x+x2yy−2x2y)−(xx+xy−2x)+3P=(x3x+x3y−2x3)+(x2y.x+x2yy−2x2y)−(xx+xy−2x)+3
P=x3(x+y−2)+x2y(x+y−2)−x(x+y−2)+3P=x3(x+y−2)+x2y(x+y−2)−x(x+y−2)+3
P=x3.0+x2y.0−x.0+3P=x3.0+x2y.0−x.0+3
P=3
a: \(A=2\left(x+y\right)+3xy\left(x+y\right)+5x^2y^2\left(x+y\right)=0\)
b: \(B=3xy\left(x+y\right)+2x^2y\left(x+y\right)=0\)
Do \(x+y-2=0\Leftrightarrow x+y=2\Leftrightarrow x-2=-y\)
\(N=x^2\left(x-2\right)-xy^2+2xy+2\left(x+y\right)-2\)
\(=-x^2y-xy^2+2xy+2.2-2=-xy\left(x+y\right)+2xy+2=-2xy+2xy+2=2\)