cos (A-C)/2=√2/2
有题设知A+B+C=3B=π故B=π/3=60'因此cosB =1/2题设条件化为1/cosA +1/cosC=-2√2又由和差化积积化和差倍角公式1/cosA +1/cosC=(cosA+ cosC)/cosAcosC=4cos(A +C/2)cos(A-C/2)/(cos(A +C) cos(A-C))=2cos(A-C/2)/(-1/2) +cos(A-C)=-2√2
设(A-C)/2=x 那么上式化为cosx /(-1/2)+ cos2x=-√2 推出4cosx ^2 +√2cosx-3=0 解得cosx=√2/2 (另外一个值-3√2/4舍去,因为不可能是负值)即cos (A-C)/2=√2/2