" 13.If "a,b," care the sides of a triangle,then find the minimum value of "(a)/(b+c-a)+(b)/(c+a-b)+(c)/(a+b-c)

If a,b,c are the sides of a triangle,then the minimum value of (a)/(b+c-a)+(b)/(c+a-b)+(c)/(a+b-c) is equal to (a)3(b)6(c)9(d)12

If a,b and c are the side of a triangle,then the minimum value of (2a)/(b+c-a)+(2b)/(c+a-b)+(2c)/(a+b-c) is 3 (b) 9(c)6(d)1

If a , b and c are the side of a triangle, then the minimum value of (2a)/(b+c-a)+(2b)/(c+a-b)+(2c)/(a+b-c)i s (a) 3 (b) 9 (c) 6 (d) 1

If a , ba n dc are the side of a triangle, then the minimum value of (2a)/(b+c-a)+(2b)/(c+a-b)+(2c)/(a+b-c)i s (a) 3 (b) 9 (c) 6 (d) 1

If a , ba n dc are the side of a triangle, then the minimum value of (2a)/(b+c-a)+(2b)/(c+a-b)+(2c)/(a+b-c)i s (a) 3 (b) 9 (c) 6 (d) 1

If a ,b ,c are the sides of a triangle, then the minimum value of a/(b+c-a)+b/(c+a-b)+c/(a+b-c) is equal to (a) 3 (b) 6 (c) 9 (d) 12

If a ,b ,c are the sides of a triangle, then the minimum value of a/(b+c-a)+b/(c+a-b)+c/(a+b-c) is equal to (a) 3 (b) 6 (c) 9 (d) 12

If a , b , c are the sides of triangle , then the least value of (a)/(c+a-b)+(b)/(a+b-c)+(c )/(b+c-a) is

If a , b , c are the sides of triangle , then the least value of (a)/(c+a-b)+(b)/(a+b-c)+(c )/(b+c-a) is

If a , b , c are the sides of triangle , then the least value of (a)/(c+a-b)+(b)/(a+b-c)+(c )/(b+c-a) is