Решение
№ 104.
(tg³x - tg³y) / [(1 + tgxtgy)(tg²x + tgxtgy + tg²y)] =
= [(tgx - tgy)*(tg²x + tgxtgy + tg²y)] / [(1 + tgxtgy)(tg²x + tgxtgy + tg²y)] =
= (tgx - tgy) / (1 + tgxtgy) = tg(x - y)
№105.
(cos⁴2a - sin⁴2a) / (cos4a) - (cos2a - sin2a)² =
= [(cos²2a - sin²2a) * (cos²2a + sin²2a)] / (cos4a) - (cos²2a - 2sin2acos2a + sin²2a) = (cos²2a - sin²2a) / cos4a - 1 + 2sin2acos2a =
= cos4a / cos4a -1 + sin4a = 1 - 1 + sin4a = sin4a
№ 106.
[ 1/(1 - tgx) - 1/(1 + tgx)] * (cos²x - sin²x) =
= (1 + tgx - 1 + tgx)*cos2x / (1 - tg²x) =
= [2tgx*(1 - tg²x)] (1 - tg²x)(1 + tg²x)] = 2tgx / (1 + tg²x) = sin2x
1)6(х+у)
4(5а-b)
x(c+d)
2)(x+a)(x+a)
(2a-5b)(2a-5b)
(3p-8)(3p-8)
3)7xy(2x-y+3xy)
20a{в четвертой} b³(2+4b-3ab²)
4)2m(a-b) - 3n(a-b) = (a-b)(2m-3n)
(a-14)(a-14-7) = (a-14)(a-21)