Câu hỏi của lộc Nguyễn

Question

Phân tích đa thức thành nhân tử A ) xy(z+y)+yz(y+z)+zx(z+x)B )xy(x+y)-yz(y+z)-zx(z-x)

Minh Triều · Accepted Answer

A ) xy(z+y)+yz(y+z)+zx(z+x)=y.[x(z+y)+z(y+z)]+zx(z+x)=y.(xz+xy+zy+z2)+zx(z+x)=y.(xz+z2+xy+zy)+zx(z+x)=y.[z.(z+x)+y.(z+x)]+zx(z+x)=y.(z+x)(z+y)+zx(z+x)=(z+x)[y(z+y)+zx]=(z+x)(yz+y2+zx)B )xy(x+y)-yz(y+z)-zx(z-x)=y.[x(x+y)-z(y+z)]-zx(z-x)=y.(x2+xy-zy-z2)-zx(z-x)=y.(x2-z2+xy-zy)-zx(z-x)=y.[(x+z)(x-z)+y.(x-z)]-zx(z-x)=y.(x-z)(x+z+y)+zx(x-z)=(x-z)[y(x+z+y)+zx]=(x-z)(yx+yz+y2+zx)=(x-z)(yx+zx+yz+y2)=(x-z)[x.(y+z)+y.(y+z)]=(x-z)(y+z)(x+y) Câu trả lời: A ) xy(z+y)+yz(y+z)+zx(z+x)=y.[x(z+y)+z(y+z)]+zx(z+x)=y.(xz+xy+zy+z2)+zx(z+x)=y.(xz+z2+xy+zy)+zx(z+x)=y.[z.(z+x)+y.(z+x)]+zx(z+x)=y.(z+x)(z+y)+zx(z+x)=(z+x)[y(z+y)+zx]=(z+x)(yz+y2+zx)B )xy(x+y)-yz(y+z)-zx(z-x)=y.[x(x+y)-z(y+z)]-zx(z-x)=y.(x2+xy-zy-z2)-zx(z-x)=y.(x2-z2+xy-zy)-zx(z-x)=y.[(x+z)(x-z)+y.(x-z)]-zx(z-x)=y.(x-z)(x+z+y)+zx(x-z)=(x-z)[y(x+z+y)+zx]=(x-z)(yx+yz+y2+zx)=(x-z)(yx+zx+yz+y2)=(x-z)[x.(y+z)+y.(y+z)]=(x-z)(y+z)(x+y)

Long Trần · Answer

b. $\text{     xy(x+y)-yz(y+z)-xz(z-x)
=xy(x+y+z-z)+yz(y+z)+xz(x-z)
=xy(x-z)+xy(y+z)+yz(y+z)+xz(x-z)
=(x+y)(y+z)(x-z)
}$Câu trả lời: b. $\text{     xy(x+y)-yz(y+z)-xz(z-x)
=xy(x+y+z-z)+yz(y+z)+xz(x-z)
=xy(x-z)+xy(y+z)+yz(y+z)+xz(x-z)
=(x+y)(y+z)(x-z)
}$

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