(cos x)^2+(cos 2x)^2+(cos 3x)^2+(cos 4x)^2=2
(1+cos 2x)/2+(1+cos 4x)/2+(1+cos 6x)/2+(1+cos 8x)/2=2
1+cos 2x+1+cos 4x+1+cos 6 x+1+cos 8x=4
cos 2x+cos 4x+cos 6 x+cos 8x=0
(cos 2x+cos 8x)+(cos 4x+cos 6 x)=0
2*cos 5x*cos 3x+2*cos 5x*cos x =0
cos 5x*(cos 3x+cos x)=0
2*cos 5x*cos 2x*cos x=0
Отсюда три случая
1) cos x=0 =>x= pi/2+pi*k
2) cos 2x=0 => 2x=pi/2+pi*m => x=pi/4+pi*m/2
3) cos 5x=0 => 5x=pi/2+pi*n => x=pi/10+pi*n/5
x=pi/4+pi*m/2 и x=pi/10+pi*n/5
-9х=243
х=243÷(-9)
х=-27
4х=0,24
х=0,24÷4
х=0,06
7х=7,063
х=7,063÷7
х=1,009
Task/25060814
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sinx +cosx =√2 ; || : √2
(1/√2)*sinx +(1/√2)*cosx = 1 ;
cos(π/4)*sinx +sin(π/4)*cosx =1 ; * * * sin(π/4)*sinx +cos(π/4)*cosx =1 * * *<span>
sin(x+</span>π/4) =1 ; * * * cos(x -π/4) =1 * * *
x+π/4 =π/2+2π*n ,n∈Z * * * x -π/4 =2<span>π*n ,n∈Z * * * </span>
x =π/4+2π*n , n∈Z . * * * x =π/4 +2π*n ,n∈Z * * *
<span>
ответ : </span>x =π/4 +2π*n ,n∈Z .
<span>
------- P.S. </span>-------
формула дополнительного(вспомогательного) угла :<span>
a*sinx +b*cosx =</span>√(a²+b²) sin(x +arctg(b/a)) <span>.</span>