三角形ABC中证明 COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SIN(C/2)

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三角形ABC中证明COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SIN(C/2)三角形ABC中证明COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SI

三角形ABC中证明 COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SIN(C/2)
三角形ABC中证明 COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SIN(C/2)

三角形ABC中证明 COSA+COSB+COSC=1+4SIN(A/2)*SIN(B/2)*SIN(C/2)
cosA+cosB+cosC =2cos[(A+B)/2]cos[(A-B)/2]+cosC =2cos[(?貱)/2]cos[(A-B)/2]+cosC =2sin(c/2)cos[(A-B)/2]+1-2[sin(C/2)]^2 =1+2sin(c/2){cos[(A-B)/2]-[sin(C/2)]} =1+2sin(c/2){cos[(A-B)/2]-[sin(?A-B)/2]} =1+2sin(c/2){cos[(A-B)/2]-[cos[(A+B)/2]} =1+2sin(c/2)[-2sin(A/2)sin(-B/2)] =1+4sin(A/2)sin(B/2)sin(C/2)

cosA+cosB+cosC=2cos[(A+B)/2]cos[(A-B)/2]+cosC=2cos[(π-C)/2]cos[(A-B)/2]+cosC=2sin(c/2)cos[(A-B)/2]+1-2[sin(C/2)]^2=1+2sin(c/2){cos[(A-B)/2]-[sin(C/2)]}=1+2sin(c/2){cos[(A-B)/2]-[sin(π -A-B)/2]}=1+2sin(c/2){cos[(A-B)/2]-[cos[(A+B)/2]}=1+2sin(c/2)[-2sin(A/2)sin(-B/2)]=1+4sin(A/2)sin(B/2)sin(C/2)