а) х^2 - 1 = (x-1)(x+1)
б) х^2 + 4х +4 = (x+2)(x+2)
в) 25у ^2 - 4 = 25у ^2 - 2^2 = (5y-2)(5y+2)
г) 36а^2 – 60ав +25в^2 = (6a-5в)(6а-5в)
<span>(х</span>²<span>-1)(х</span>²<span>+3)=(х</span>²<span>+1)</span>²<span>+х
х</span>⁴+3х²-х²=х⁴+2х²+1+х
3х²-х²-3=2х²+1+х
2х²-3=2х²+1+х
-3=1+х
-х=1+3
-х=4
х=-4
Ответ: -4.
Sinx/cosx -sinx=2*(1-cosx)/2
(sinx-sinxcosx)/cosx=1-cosx
sinx(1-cosx)/cosx -(1-cosx)=0
(1-cosx)(sinx-cosx)/cosx=0
cosx≠0⇒(1-cosx)(sinx-cosx)=0
1-cosx=0⇒cosx=1⇒x=2πn
sinx-cosx=0/cosx≠0
tgx-1=0⇒tgx=1⇒x=π/4+πn
6х + 1/2х - 4=5
61/2х - 4 = 5
6 1/2х = 9
х = 9:6 1/2
х = 18/13
х= 1 5/13