如果△ABC内接于半径为R的圆,且2R(sin2A-sin2C)=(根号2a-b)sinB,求△ABC的面积的最大值 要过程
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a/sinA=b/sinB=c/sinC=2R=2√2
=>a=2RsinA,b=2RsinB,c=2RsinC
2√2(sin²A-sin²C)=(a-b)sinB
=>4R²(sin²A-sin²C)=2R(a-b)sinB
=>a²-c²=(a-b)b
=>(a²+b²-c²)/2ab=1/2=cosC
=>C=60°
S△ABC=absinC/2=2RsinA*2RsinB*sinC/2
=√3(2sinAsinB)=√3[cos(A-B)-cos(A+B)]
=√3[cos(A-B)+1/2]≤3√3/2
=>a=2RsinA,b=2RsinB,c=2RsinC
2√2(sin²A-sin²C)=(a-b)sinB
=>4R²(sin²A-sin²C)=2R(a-b)sinB
=>a²-c²=(a-b)b
=>(a²+b²-c²)/2ab=1/2=cosC
=>C=60°
S△ABC=absinC/2=2RsinA*2RsinB*sinC/2
=√3(2sinAsinB)=√3[cos(A-B)-cos(A+B)]
=√3[cos(A-B)+1/2]≤3√3/2
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