Let ABC be a triangle inscribed in a circle and letl_(a)=(m_(a))/(M_(a)), l_(b)=(m_(b))/(M_(b)), l_(c )=(m_(c ))/(M_(c )) where m_(a), m_(b), m_(c ) are the lengthsof the angle bisectors of angles A, B and C respectively , internal to the triangle and M_(a), M_(b) and M_(c ) are the lengths of these internalangle bisectors extended until they meet the circumcircle. Q. The minimum value of the expression (l_(a))/(sin^(2)A)+(l_(b))/(sin^(2)B)+(l_(c ))/(sin^(2)C) is :

Let ABC be a triangle inscribed in a circle and letl_(a)=(m_(a))/(M_(a

1.	Let ABC be a triangle inscribed in a circle and letl_(a)=(m_(a))/(M_(a)), l_(b)=(m_(b))/(M_(b)), l_(c )=(m_(c ))/(M_(c )) where m_(a), m_(b), m_(c ) are the lengthsof the angle bisectors of angles A, B and C respectively , internal to the triangle and M_(a), M_(b) and M_(c ) are the lengths of these internalangle bisectors extended until they meet the circumcircle. Q. The minimum value of the expression (l_(a))/(sin^(2)A)+(l_(b))/(sin^(2)B)+(l_(c ))/(sin^(2)C) is :
Answer» 2 3 4 none of these ANSWER :B

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