Sin²x-cos²x=cos4x
-(cos²x-sin²x)=cos4x
-cos2x-cos4x=0
cos2x+cos4x=0
2cos(²ˣ⁺⁴ˣ/₂)cos(²ˣ⁻⁴ˣ/₂)=0
cos3x cos(-x)=0
cos3x cosx=0
a) cos3x=0
3x=π/2 + πn
x= π/6 + (πn)/3, n∈Z
б) сosx=0
x=π/2 + πn, n∈Z
Ответ: π/6 + (πn)/3, n∈Z;
π/2 + πn, n∈Z.
<span>(x-1)²<√2(x-1)
</span><span>(x-1)²-√2(x-1)<0
</span>(x-1)(x-1-√2)<0
x∈(1;1+√2)
д) (u+v)(u-v)(u-v)
е) (u +v)(u^2 -uv+v^2)(u+v)
2) а) 1/х1 +1/х2 = (х2 +х1)/х1*х2 по теореме Виета х2+х1= -1/6 х1*х2 = -2/6, значит
1/х1 +1/х2 = (-1/6): (-2/6)= 1/2=0,5
в) (х1^3 +x2 ^3)/(x1 ^3 * x2^3) = (x1+x2)(x1^2 -x1*x2 +x2^2)/(x1*x2)^3 = (x1+x2)(x1^2 -x1*x2 +x2^2 -2x1*x2+2x1*x2)/(x1*x2)^3 = (x1+x2)((x1 +x2)^2 -3x1x2)/(x1*x2)^3 = -1/6 * (1/36 +2/3)/ (-8/216) = -1/6 *25/36 /(-8/216) = -25/216 *(-216/8) = 25/8
б) (-1/6)^2 - 2* (-2/6))^2 - 2*(-2/6)^2 = (1/36 +4/6)^2 - 4/18 = 625/1296 - 4/18 =337/1296