b) Chứng minh 2sin2A = tanB.tanC.
Giải thích
b) Ta có: tanB=sinBcosB=b2R.a2+c2−b22ac=abcRa2+c2−b2
⇒tanB.tanC=a2b2c2R2a4−b2−c22=a2b2c2R2b4+c4−b2−c22=a2b2c2R2.2b2c2=a22R2=2a2R2=2sin2A
b) Ta có: tanB=sinBcosB=b2R.a2+c2−b22ac=abcRa2+c2−b2
⇒tanB.tanC=a2b2c2R2a4−b2−c22=a2b2c2R2b4+c4−b2−c22=a2b2c2R2.2b2c2=a22R2=2a2R2=2sin2A