证明sinA+sinC=2sin(A+C)/2 * cos(A-C)/2
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证明sinA+sinC=2sin(A+C)/2*cos(A-C)/2证明sinA+sinC=2sin(A+C)/2*cos(A-C)/2证明sinA+sinC=2sin(A+C)/2*cos(A-C)
证明sinA+sinC=2sin(A+C)/2 * cos(A-C)/2
证明sinA+sinC=2sin(A+C)/2 * cos(A-C)/2
证明sinA+sinC=2sin(A+C)/2 * cos(A-C)/2
A=(A+C)/2+(A-C)/2
C=(A+C)/2-(A-C)/2
左边=[sin(A+C)/2cos(A-C)/2+cos(A+C)/2sin(A-C)/2]+[sin(A+C)/2cos(A-C)/2-cos(A+C)/2sin(A-C)/2]
=2sin(A+C)/2cos(A-C)/2