作业帮求证tana/2=sina除以1+cosa=1-cosa除以sina
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求证tana/2=sina除以1+cosa=1-cosa除以sina
求证tana/2=sina除以1+cosa=1-cosa除以sina
求证tana/2=sina除以1+cosa=1-cosa除以sina
sina/(1+cosa)=[2sin(a/2)*cos(a/2)]/[1+cos²(a/2)-sin²(a/2)]
=[2sin(a/2)*cos(a/2)]/[2cos²(a/2)]
=sin(a/2)/cos(a/2)
=tan(a/2)
(1-cosa)/sina={1-[cos²(a/2)-sin²(a/2)}/[2sin(a/2)*cos(a/2)]
=[2sin²(a/2)]/[2sin(a/2)*cos(a/2)]
=sin(a/2)/cos(a/2)
=tan(a/2)
所以得证……………………………………………………
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