1. По формуле косинуса суммы:
cos(a+π/3)=сos(a)*cos(π/3)-sin(π/3)*sin(a)=cos(a)/2-(√3*sin(a))/2=(cos(a)-(√3*sin(a)))/2=(cos(a)-(√3*√(1-cos(a))))/2=
=(-15/17-(√3*√(1-15/17))/2=-(15+√102/17)/2=7.5+√102/32
2.Формула разности синусов
sin(a-π/4)=sin(a)*cos(π/4)-sin(π/4)*cos(a)=√2/2*(sin(a)-cos(a))
Применив основное тригонометрическое тождество
=√2/2*(1-2cos(a))=√2/2-√2*соs(a)=√2/2-√2*√(1-sin(a))=
=√2/2-√2*√(1-0.6)=√2/2-(2√5)/5
3. sin(a-b) + sin(π/2-a)*sin(b)=
Формула суммы синусов
sin(a)*cos(b)-sin(b)*cos(a)+(sin(π/2)*cos(a)-sin(a)*cos(π/2))*sinb=sin(a)*(cos(b)-sin(b)*(cos(a)-(sin(π/2)*cos(a)-sin(a)*cos(π/2))=
sin(a)*cos(b)-sin(b)*(cos(a)-(sin(π/2)*cos(a)-sin(a)*cos(π/2)))=sin(a)*cos(b)-sin(b)*(cos(a)-sin(π/2)*cos(a)+sin(a)*cos(π/2))=sin(a)*cos(b)-sin(b)*(cos(a)(1-2*sin(π/2))+cos(π/2)*(sin(a)+cos(a))=
=sin(a)*cos(b)-sin(b)*(cos(a)*(1-√2)+√2/2*(sin(a)+cos(a))=sin(a)*cos(b)-sin(b)*(cos(a)-√2/2*cos(a)+√2/2*sin(a)=sin(a)*cos(b)-sin(b)*(cos(a)*(1-√2)+√2/2*(sin(a)+cos(a))=sin(a)*(cos(b)-√2/2*sin(b))-sin(b)*(cos(a)*(1-√2)+√2/2*(cos(a)))=sin(a)*(cos(b)-√2/2*sin(b))-sin(b)*((2-√2)*cos(a))=-sin(b)*((4+√2)/2)+sin(a)*cos(b)-sin(b)*cos(a)=sin(a-b)-sin(b)*((4+√2)/2)