(tg п/9+tg5п/36)/1+tg8п/9*tg5п/36=(tgп/9+tg5п/36)/1+tg(9п/9-п/9)*tg5п/36=(tgп/9+tg5п/36)/1-tgп/9* tg5п/36=tg(п/9+5п/36)=tg(20+25)=tg45=1
1) x^2-2x-24=0 при х≠-4
D=k^2-c, D=(-1)^2-(-24), D=25
x=-k±√D, x=1±√25, x₁=1-5=-4 - не подходит, х₂=1+5=6
Ответ: х=6
2) x^2-3x-28=0 при х≠4 и х≠-4
D=b^2-4ac, D=(-3)^2-4*1*(-28), D=9+112, D=121
x=(-b±√D)/2a, x=(3±√121)/2*1, x₁=(3-11)/2=-8/2=-4 - не подходит, х₂=(3+11)/2=14/2=7
Ответ: х=7
3) 2х^2+5х-3=0 при х≠-5 и х≠5
D=b^2-4ac, D=5^2-4*2*(-3), D=25+24, D=49
x=(-b±√D)/2a, x=(-5<span>±</span>√49)/2*2, x₁=(-5-7)/4=-12/4=-3, x₂=(-5+7)/4=2/4=1/2=0,5
Ответ: х=-3, х=0,5
sin²x+cos²x+2sin x*cos x=cjs x+sin x
(sin x+cos x)²-(cos x+sin x)=0
sin x+cos x) (sin x+cos x-1)=0
1)sin x+cos x=0 /cos x
tg x=-1 x=-π/4=πn n∈z
2)sin x+cos x=1 sin x+sin(π/2-x)=1 2sin(x+π/2-x)/2cos (x-π/2+x)/2=1
2sinπ/4*cos(x-π/4)=1 2*√2/2*cos(x-π/4)=1 √2cos(x-π/4)=1 cos (x-π/4)=√2/2
x-π/4= +-π/4+2πn x=+-π/4+π/4+2πn
x1=π/4+π/4+2πn=π/2+2πn. n∈z
x2=-π/4+π/4+2πk=2πk. k∈z