题目内容

把下列各式分解因式

(1)

(2)

(3)2(mn)(a+2b-3c)-3(m+4n)(3ca-2b);

(4)m(mn)(ab)-3n(nm)(ba);

(5)a(ab)+b(ba).

答案:
解析:

(1)

=

=[2m-(ab)]

=(2mab).

(2)

=

=

=[n+(mn)]

=

(3)2(mn)(a+2b-3c)-3(m+4n)(3ca-2b)

=2(mn)(a+2b-3c)-3(m+4n)[-(a+2b-3c)]

=2(mn)(a+2b-3c)+3(m+4n)(a+2b-3c)

=(a+2b-3c)[2(mn)+3(m+4n)]

=(a+2b-3c)(2m-2n+3m+12n)

=(a+2b-3c)(5m+10n)

=5(m+2n)(a+2b-3c).

(4)m(mn)(ab)-3n(nm)(ba)

=m(mn)(ab)-3n[-(mn)][-(ab)]

=m(mn)(ab)-3n(mn)(ab)

=(mn)(ab)(m-3n).

(5)a(ab)+b(ba)=a(ab)-b(ab)

=(ab)(ab)=


提示:

(1)题应把作为公因式;(2)题=,因为公因式为;(3)题因为3ca-2b=-(a+2b-3c),所以公因式为(a+2b-3c);(4)题因为(nm)(ba)=(mn)(ab),所以公因式为(mn)(ab);题(5)公因式为(ab).


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