Ответ №1
2 - 3cos4x -sin2x = 0 ; x ∈[-π/8 ; 5π/8 ] .
* * * cos2α=cos²α -sin²α = 1-sin²α -sin²α =1 -2sin²α * * *
* * * cos4x =cos2*(2x) = 1 -2sin²2x * * *
2 - 3(1-2sin²2x) -sin2x = 0 ;
6sin²2x -sin2x -1 = 0 ;
6t² -t -1 = 0 ; * * * D =1² -4*6*(-1) =25 =5² * * *
t₁= (1-5)/(2*6) = -1/3 ;
t₂= (1+5)/12 = 1/2.
а) sin2x=1/2 ;
[ 2x = π/6 +2πn ; 2x =(π -π/6) +2πn , n∈Z.
[ x = π/12 +πn ; x =5π/12+πn , n∈Z.
учитывая условия x ∈ [-π/8;5π/8 ] , получается [x = π/12 ; x=5π/12.
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б) sin2x= -1/3⇔2x =(-1)^(n+1) arcsin(1/3)+πn, n∈Z.
[ x = -(1/2)arcsin(1/3) + πn ; x=(1/2)*(-π+arcsin(1/3)+πn, n∈Z;
ответ: -(1/2)arcsin(1/3) ; π/6 ; 5π/12 .
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