помогите решить пару примеров задание очень трудное полное решение
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Ответы на вопрос
Ответил blowme
0
немного корявый ответ
Приложения:
Ответил blowme
0
ну просто у меня иногда что-то получается, а иногда не получается, блин, всякое бывает
Ответил blowme
0
а тут можно только одно решение добавлять? просто я еще одно решила, только не знаю куда добавлять, это точно правильно решила
Ответил dako03
0
нет в ответе 1 дробь (a+b)(c-b) в 3 примере 1 дробь a+3
Ответил blowme
0
хоть что-то правильно?
Ответил dako03
0
Да 3 пример
Ответил mappku
0
266.
1)
![frac{a^2-ab}{a^2b-b^3}+frac{2a^2}{b^2-ab^2+a^2b-a^3}-frac{a}{a^2-2ab+b^2}=\
=frac{a(a-b)}{b(a-b)(a+b)}-frac{a}{(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a}{b(a+b)}-frac{a}{(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a^2+ab-ab}{b(a+b)^2}+...=\
=frac{a^2}{b(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a^2b^2-a^3b^2+a^4b-a^5+2ba^4+2a^3b^2+2a^2b^3}{(ba^2+2ab^2+b^3)(b^2-ab^2+a^2b-a^3)}=\
=frac{-a^5+3a^4b+a^3b^2+2a^2b^3+a^2b^2}{(...)}=\
=](https://tex.z-dn.net/?f=frac%7Ba%5E2-ab%7D%7Ba%5E2b-b%5E3%7D%2Bfrac%7B2a%5E2%7D%7Bb%5E2-ab%5E2%2Ba%5E2b-a%5E3%7D-frac%7Ba%7D%7Ba%5E2-2ab%2Bb%5E2%7D%3D%5C%0A%3Dfrac%7Ba%28a-b%29%7D%7Bb%28a-b%29%28a%2Bb%29%7D-frac%7Ba%7D%7B%28a%2Bb%29%5E2%7D%2Bfrac%7B2a%5E2%7D%7Bb%5E2-ab%5E2%2Ba%5E2b-a%5E3%7D%3D%5C%0A%3Dfrac%7Ba%7D%7Bb%28a%2Bb%29%7D-frac%7Ba%7D%7B%28a%2Bb%29%5E2%7D%2Bfrac%7B2a%5E2%7D%7Bb%5E2-ab%5E2%2Ba%5E2b-a%5E3%7D%3D%5C%0A%3Dfrac%7Ba%5E2%2Bab-ab%7D%7Bb%28a%2Bb%29%5E2%7D%2B...%3D%5C%0A%3Dfrac%7Ba%5E2%7D%7Bb%28a%2Bb%29%5E2%7D%2Bfrac%7B2a%5E2%7D%7Bb%5E2-ab%5E2%2Ba%5E2b-a%5E3%7D%3D%5C%0A%3Dfrac%7Ba%5E2b%5E2-a%5E3b%5E2%2Ba%5E4b-a%5E5%2B2ba%5E4%2B2a%5E3b%5E2%2B2a%5E2b%5E3%7D%7B%28ba%5E2%2B2ab%5E2%2Bb%5E3%29%28b%5E2-ab%5E2%2Ba%5E2b-a%5E3%29%7D%3D%5C%0A%3Dfrac%7B-a%5E5%2B3a%5E4b%2Ba%5E3b%5E2%2B2a%5E2b%5E3%2Ba%5E2b%5E2%7D%7B%28...%29%7D%3D%5C%0A%3D "frac{a^2-ab}{a^2b-b^3}+frac{2a^2}{b^2-ab^2+a^2b-a^3}-frac{a}{a^2-2ab+b^2}=\
=frac{a(a-b)}{b(a-b)(a+b)}-frac{a}{(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a}{b(a+b)}-frac{a}{(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a^2+ab-ab}{b(a+b)^2}+...=\
=frac{a^2}{b(a+b)^2}+frac{2a^2}{b^2-ab^2+a^2b-a^3}=\
=frac{a^2b^2-a^3b^2+a^4b-a^5+2ba^4+2a^3b^2+2a^2b^3}{(ba^2+2ab^2+b^3)(b^2-ab^2+a^2b-a^3)}=\
=frac{-a^5+3a^4b+a^3b^2+2a^2b^3+a^2b^2}{(...)}=\
=")
2)
![frac{1}{a^2-ac-ab+bc}+frac{2}{b^2-ab-bc+ac}+frac{1}{c^2-ac-bc+ab}=\
=frac{1}{a(a-c)-b(a-c)}+frac{2}{-b(a-b)+c(a-b)}+frac{1}{c(c-b)-a(c-b)}=\
=frac{1}{(a-b)(a-c)}+frac{2}{(a-b)(c-b)}+frac{-1}{(c-b)(a-c)}=\
=frac{c-b+2a-2c-a+b}{(a-b)(c-b)(a-c)}=frac{a-c}{(a-b)(c-b)(a-c)}=\
=frac{1}{(a-b)(c-b)}=frac{1}{b^2-ab-bc+ac};](https://tex.z-dn.net/?f=frac%7B1%7D%7Ba%5E2-ac-ab%2Bbc%7D%2Bfrac%7B2%7D%7Bb%5E2-ab-bc%2Bac%7D%2Bfrac%7B1%7D%7Bc%5E2-ac-bc%2Bab%7D%3D%5C%0A%3Dfrac%7B1%7D%7Ba%28a-c%29-b%28a-c%29%7D%2Bfrac%7B2%7D%7B-b%28a-b%29%2Bc%28a-b%29%7D%2Bfrac%7B1%7D%7Bc%28c-b%29-a%28c-b%29%7D%3D%5C%0A%3Dfrac%7B1%7D%7B%28a-b%29%28a-c%29%7D%2Bfrac%7B2%7D%7B%28a-b%29%28c-b%29%7D%2Bfrac%7B-1%7D%7B%28c-b%29%28a-c%29%7D%3D%5C%0A%3Dfrac%7Bc-b%2B2a-2c-a%2Bb%7D%7B%28a-b%29%28c-b%29%28a-c%29%7D%3Dfrac%7Ba-c%7D%7B%28a-b%29%28c-b%29%28a-c%29%7D%3D%5C%0A%3Dfrac%7B1%7D%7B%28a-b%29%28c-b%29%7D%3Dfrac%7B1%7D%7Bb%5E2-ab-bc%2Bac%7D%3B "frac{1}{a^2-ac-ab+bc}+frac{2}{b^2-ab-bc+ac}+frac{1}{c^2-ac-bc+ab}=\
=frac{1}{a(a-c)-b(a-c)}+frac{2}{-b(a-b)+c(a-b)}+frac{1}{c(c-b)-a(c-b)}=\
=frac{1}{(a-b)(a-c)}+frac{2}{(a-b)(c-b)}+frac{-1}{(c-b)(a-c)}=\
=frac{c-b+2a-2c-a+b}{(a-b)(c-b)(a-c)}=frac{a-c}{(a-b)(c-b)(a-c)}=\
=frac{1}{(a-b)(c-b)}=frac{1}{b^2-ab-bc+ac};")
3)
![frac{a+2}{a^3-3a^2-4a+12}-frac{3-a}{a^2-5a+6}+frac{6}{9-a^2}=\
|a^2-5a+6=a^2-3a-2a+6=a(a-3)-2(a-3)=\
=(a-3)(a-2)=(2-a)(3-a);|\
|a^3-3a^2-4a+12=|a=-2|=a^3+2a^2-5a^2-10a+6a+12=\
=a^2(a+2)-5a(a+2)+6(a+2)=(a+2)(a^2-5a+6)=\
=(a+2)(a-2)(a-3)|\
=frac{a+2}{(a+2)(a-2)(a-3)}-frac{3-a}{(a-3)(a-2)}+frac{6}{(3-a)(3+a)}=\
=frac{1}{(a-2)(a-3)}+frac{1}{a-2}-frac{6}{(a-3)(a+3)}=\
= frac{a+3+a^2-9-6a+12}{(a-2)(a^2-9)}=frac{a^2-5a+6}{(a-2)(a^2-9)}=\
=frac{(a-3)(a-2)}{(a-2)(a-3)(a+3)}=frac{1}{a+3};\](https://tex.z-dn.net/?f=frac%7Ba%2B2%7D%7Ba%5E3-3a%5E2-4a%2B12%7D-frac%7B3-a%7D%7Ba%5E2-5a%2B6%7D%2Bfrac%7B6%7D%7B9-a%5E2%7D%3D%5C%0A%7Ca%5E2-5a%2B6%3Da%5E2-3a-2a%2B6%3Da%28a-3%29-2%28a-3%29%3D%5C%0A%3D%28a-3%29%28a-2%29%3D%282-a%29%283-a%29%3B%7C%5C%0A%7Ca%5E3-3a%5E2-4a%2B12%3D%7Ca%3D-2%7C%3Da%5E3%2B2a%5E2-5a%5E2-10a%2B6a%2B12%3D%5C%0A%3Da%5E2%28a%2B2%29-5a%28a%2B2%29%2B6%28a%2B2%29%3D%28a%2B2%29%28a%5E2-5a%2B6%29%3D%5C%0A%3D%28a%2B2%29%28a-2%29%28a-3%29%7C%5C%0A%3Dfrac%7Ba%2B2%7D%7B%28a%2B2%29%28a-2%29%28a-3%29%7D-frac%7B3-a%7D%7B%28a-3%29%28a-2%29%7D%2Bfrac%7B6%7D%7B%283-a%29%283%2Ba%29%7D%3D%5C%0A%3Dfrac%7B1%7D%7B%28a-2%29%28a-3%29%7D%2Bfrac%7B1%7D%7Ba-2%7D-frac%7B6%7D%7B%28a-3%29%28a%2B3%29%7D%3D%5C%0A%3D+frac%7Ba%2B3%2Ba%5E2-9-6a%2B12%7D%7B%28a-2%29%28a%5E2-9%29%7D%3Dfrac%7Ba%5E2-5a%2B6%7D%7B%28a-2%29%28a%5E2-9%29%7D%3D%5C%0A%3Dfrac%7B%28a-3%29%28a-2%29%7D%7B%28a-2%29%28a-3%29%28a%2B3%29%7D%3Dfrac%7B1%7D%7Ba%2B3%7D%3B%5C "frac{a+2}{a^3-3a^2-4a+12}-frac{3-a}{a^2-5a+6}+frac{6}{9-a^2}=\
|a^2-5a+6=a^2-3a-2a+6=a(a-3)-2(a-3)=\
=(a-3)(a-2)=(2-a)(3-a);|\
|a^3-3a^2-4a+12=|a=-2|=a^3+2a^2-5a^2-10a+6a+12=\
=a^2(a+2)-5a(a+2)+6(a+2)=(a+2)(a^2-5a+6)=\
=(a+2)(a-2)(a-3)|\
=frac{a+2}{(a+2)(a-2)(a-3)}-frac{3-a}{(a-3)(a-2)}+frac{6}{(3-a)(3+a)}=\
=frac{1}{(a-2)(a-3)}+frac{1}{a-2}-frac{6}{(a-3)(a+3)}=\
= frac{a+3+a^2-9-6a+12}{(a-2)(a^2-9)}=frac{a^2-5a+6}{(a-2)(a^2-9)}=\
=frac{(a-3)(a-2)}{(a-2)(a-3)(a+3)}=frac{1}{a+3};\")
4)
![frac{21-7b}{b^3+2b^2-9b-18}+frac{4-b}{b^2+5b+6}-frac{2-b}{4-b^2}=\
|b^2+5b+6=(b+2)(b+3);|\
|b^3+2b^2-9b-18=b^3-3b^2+5b^2-15b+6b-18=\
=b^2(b-3)+5b(b-3)+6(b-3)=\
=(b-3)(b^2+5b+6)=(b-3)(b+3)(b+2);|\
=frac{7(3-b)}{(b-3)(b+3)(b+2)}+frac{4-b}{(b+2)(b+3)}-frac{2-b}{(2-b)(2+b)}=\
=frac{-7}{(b+3)(b+2)}+frac{4-b}{(b+3)(b+2)}-frac{1}{b+2}=\
=frac{-7+4-b-b-3}{(b+3)(b+2)}=frac{-2b-6}{(b+3)(b+2)}=frac{-2(b+3)}{(b+3)(b+2)}=\
=frac{-2}{b+2};](https://tex.z-dn.net/?f=frac%7B21-7b%7D%7Bb%5E3%2B2b%5E2-9b-18%7D%2Bfrac%7B4-b%7D%7Bb%5E2%2B5b%2B6%7D-frac%7B2-b%7D%7B4-b%5E2%7D%3D%5C%0A%7Cb%5E2%2B5b%2B6%3D%28b%2B2%29%28b%2B3%29%3B%7C%5C%0A%7Cb%5E3%2B2b%5E2-9b-18%3Db%5E3-3b%5E2%2B5b%5E2-15b%2B6b-18%3D%5C%0A%3Db%5E2%28b-3%29%2B5b%28b-3%29%2B6%28b-3%29%3D%5C%0A%3D%28b-3%29%28b%5E2%2B5b%2B6%29%3D%28b-3%29%28b%2B3%29%28b%2B2%29%3B%7C%5C%0A%3Dfrac%7B7%283-b%29%7D%7B%28b-3%29%28b%2B3%29%28b%2B2%29%7D%2Bfrac%7B4-b%7D%7B%28b%2B2%29%28b%2B3%29%7D-frac%7B2-b%7D%7B%282-b%29%282%2Bb%29%7D%3D%5C%0A%3Dfrac%7B-7%7D%7B%28b%2B3%29%28b%2B2%29%7D%2Bfrac%7B4-b%7D%7B%28b%2B3%29%28b%2B2%29%7D-frac%7B1%7D%7Bb%2B2%7D%3D%5C%0A%3Dfrac%7B-7%2B4-b-b-3%7D%7B%28b%2B3%29%28b%2B2%29%7D%3Dfrac%7B-2b-6%7D%7B%28b%2B3%29%28b%2B2%29%7D%3Dfrac%7B-2%28b%2B3%29%7D%7B%28b%2B3%29%28b%2B2%29%7D%3D%5C%0A%3Dfrac%7B-2%7D%7Bb%2B2%7D%3B "frac{21-7b}{b^3+2b^2-9b-18}+frac{4-b}{b^2+5b+6}-frac{2-b}{4-b^2}=\
|b^2+5b+6=(b+2)(b+3);|\
|b^3+2b^2-9b-18=b^3-3b^2+5b^2-15b+6b-18=\
=b^2(b-3)+5b(b-3)+6(b-3)=\
=(b-3)(b^2+5b+6)=(b-3)(b+3)(b+2);|\
=frac{7(3-b)}{(b-3)(b+3)(b+2)}+frac{4-b}{(b+2)(b+3)}-frac{2-b}{(2-b)(2+b)}=\
=frac{-7}{(b+3)(b+2)}+frac{4-b}{(b+3)(b+2)}-frac{1}{b+2}=\
=frac{-7+4-b-b-3}{(b+3)(b+2)}=frac{-2b-6}{(b+3)(b+2)}=frac{-2(b+3)}{(b+3)(b+2)}=\
=frac{-2}{b+2};")
1)
2)
3)
4)
Приложения:
Ответил mappku
0
минуту
Ответил mappku
0
час
Ответил dako03
0
Спасибо
Ответил dako03
0
Что значать полоски перед выражениями
Ответил mappku
0
Это сноски, представляю многочлены в виде произведений
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