sina=5/13,tga<0,tg(3pai/2a/2)的值
sina=5/13,tga<0,tg(3π/2+a/2)的值 解: tg(3π/2+a/2)=tg[π+(π/2)+(a/2)]=tg[(π/2)+(a/2)]=-ctg(a/2) 又sina=5/13>0,tga<0,则a是2象限角,所以cosa=-12/13 从而 ctg(a/2) =(1+cosa)/sina =[1+(-12/13)]/(5/13) =1/5 所以tg(3π/2+a/2)=-1/5