Question #19240

prove
sinD=2tan(D/2)/1+tan^2(D/2)
1

Expert's answer

2012-11-22T09:22:12-0500

Conditions

prove

sinD=2tan(D/2)/1+tan2(D/2)\sin D = 2\tan (D / 2) / 1 + \tan^2 (D / 2)

Solution

sin(D)=2sin(D2)cos(D2)=2tan(D2)cos2(D2)=2tan(D2)cos2(D2)cos2(D2)+sin2(D2)=2tan(D2)cos2(D2)+sin2(D2)=2tan(D2)1+tan2(D2)\sin (D) = 2 \sin \left(\frac {D}{2}\right) \cos \left(\frac {D}{2}\right) = 2 \tan \left(\frac {D}{2}\right) \cos^ {2} \left(\frac {D}{2}\right) = \frac {2 \tan \left(\frac {D}{2}\right) \cos^ {2} \left(\frac {D}{2}\right)}{\cos^ {2} \left(\frac {D}{2}\right) + \sin^ {2} \left(\frac {D}{2}\right)} = \frac {2 \tan \left(\frac {D}{2}\right)}{\cos^ {2} \left(\frac {D}{2}\right) + \sin^ {2} \left(\frac {D}{2}\right)} = \frac {2 \tan \left(\frac {D}{2}\right)}{1 + \tan^ {2} \left(\frac {D}{2}\right)}

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