Найдите значения выражений sin2α , cos3α , если
а) α =π/12 ; б) α =π/6 ; в) α =π /2 ; г) α = 2π/3 .
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2α = a) π/6 ; б) α =π/3 ; в) α =π ; <span> г) </span>α = 4<span>π/3 </span>
3α = a) π/4 ; б) α =π/2 ; в) α =3π /2 ; г) α = 2π
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a) sin2α =sinπ/6 =1/2 ; cos3α =cosπ/4 =√2 /2 .
б) sin2α =sinπ/3 =√3 /2 ; cos3α =cos<span>π./2 =0 .
</span>в) sin2α =sinπ =0 ; cos3α =cos3π/2 =0
г) sin2α =sin4π/3 =sin(π+π/3) = -sinπ/3 = -√3 /2 ; <span>cos3α =cos2</span>π = 1.
Cos5xcos2x-sin5xsin2x=cos(5+2)
А^2 -1.5b^2
1/5+4/5=1
-3/4-3/4=-6/4=-1.5
Я бы решал так!
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