Sinx/cosx -sinx=2*(1-cosx)/2
(sinx-sinxcosx)/cosx=1-cosx
sinx(1-cosx)/cosx -(1-cosx)=0
(1-cosx)(sinx-cosx)/cosx=0
cosx≠0⇒(1-cosx)(sinx-cosx)=0
1-cosx=0⇒cosx=1⇒x=2πn
sinx-cosx=0/cosx≠0
tgx-1=0⇒tgx=1⇒x=π/4+πn
Sin(π/2+t)=cost
cos(π-t)=-cost
tg(π-t)=-tgt
sin(π/2+t)-cos(π-t)+tg(π-t)=cost+cost-tgt=2cost-tgt
<span>2arctg1+3arcsin(-0.5)=2*π/4-3arcsin0,5=π/2-3*π/6=π/2-π/2=0</span>