Tính: x^6-y^6/x^4-y^4-x^3y+xy^3
Giải thích
Ta có: x6−y6x4−y4−x3y+xy3
=x32−y32x3x−y+y3x−y
=x3+y3x3−y3x3+y3x−y
=x3−y3x−y
=(x−y)x2+xy+y2x−y
=x2+xy+y2
Vậy x6−y6x4−y4−x3y+xy3=x2+xy+y2.
Ta có: x6−y6x4−y4−x3y+xy3
=x32−y32x3x−y+y3x−y
=x3+y3x3−y3x3+y3x−y
=x3−y3x−y
=(x−y)x2+xy+y2x−y
=x2+xy+y2
Vậy x6−y6x4−y4−x3y+xy3=x2+xy+y2.