Chứng minh tam giác ABC đều nếu

\(\cos A+\cos B+\cos C+\cos2A+\cos2B+\cos2C=0\)

rút gọn: (cos2a-sin(b-a))(2cosa.cosb-cos(a-b))

rút gọn: (cos2a-sin(b-a))(2cosa.cosb-cos(a-b))

rút gọn C=\(\dfrac{cos2a-sin\left(b-a\right)}{2cosa.cosb-cos\left(a-b\right)}\)

Cho tam giác ABC. CMR: 
a) sinA + sinB + sinC = 4cos(A/2)cos(B/2)cos(C/2) 
b) cosA + cosB + cosC = 1 + 4sin(A/2)sin(B/2)sin(C/2) 
c) sin2A + sin2B + sin2C = 4sinA.sinB.sinC 
d) cos2A + cos2B + cos2C = -(1 + 4cosA.cosB.cosC)

Cho tam giác ABC. CMR: 
a) sinA + sinB + sinC = 4cos(A/2)cos(B/2)cos(C/2) 
b) cosA + cosB + cosC = 1 + 4sin(A/2)sin(B/2)sin(C/2) 
c) sin2A + sin2B + sin2C = 4sinA.sinB.sinC 
d) cos2A + cos2B + cos2C = -(1 + 4cosA.cosB.cosC)

Cho tam giác ABC. CMR: 
a) sinA + sinB + sinC = 4cos(A/2)cos(B/2)cos(C/2) 
b) cosA + cosB + cosC = 1 + 4sin(A/2)sin(B/2)sin(C/2) 
c) sin2A + sin2B + sin2C = 4sinA.sinB.sinC 
d) cos2A + cos2B + cos2C = -(1 + 4cosA.cosB.cosC)

Cho tam giác ABC. CMR: 
a) sinA + sinB + sinC = 4cos(A/2)cos(B/2)cos(C/2) 
b) cosA + cosB + cosC = 1 + 4sin(A/2)sin(B/2)sin(C/2) 
c) sin2A + sin2B + sin2C = 4sinA.sinB.sinC 
d) cos2A + cos2B + cos2C = -(1 + 4cosA.cosB.cosC)

rút gọn: (cos2a-sin(b-a))(2cosa.cosb-cos(a-b))