tan(a/2)*tan[(a－b）/2] 　　＝{sin(a/2)/cos(a/2)}×{sin[(a－b）/2]/cos[(a－b）/2]} 　　＝{sin(a/2)×sin[(a－b）/2]}/{cos(a/2)×cos[(a－b）/2]} 　　＝(-1/2){cos[(a/2)+(a－b）/2]-cos[(a/2)-(a－b）/2]}/(1/2){cos[(a/2)+(a－b）/2]+cos[(a/2)-(a－b）/2]} 　　＝-{cos[a-(b/2)]-cos(b/2)}/{cos[a-(b/2)]+cos(b/2)} 　　(提示：根据tanx=sinx/cosx,然后将分子/分母积化和差） 　　∵5cos[a－(b/2)]+7cos(b/2)＝0 　　∴cos[a－(b/2)]＝(-7/5)cos(b/2) 　　∴tan(a/2)*tan[(a－b）/2] 　　＝-{cos[a-(b/2)]-cos(b/2)}/{cos[a-(b/2)]+cos(b/2)} 　　＝-{(-7/5)cos(b/2)-cos(b/2)}/{(-7/5)cos(b/2)+cos 　　(b/2)} 　　＝-[(-12/5)cos(b/2)]/[(-2/5)cos(b/2)] 　　＝(12/5)/(-2/5) 　　＝-6