For any three positive real numbers a,b and c,
`9(25a^2+b^2) +25(c^2 -3ac) = 15b(3a+c)` Then

For any three positive real numbers a , b and c ,9(25 a^2+b^2)+25(c^2-3a c)=15 b(3a+c)dot Then : (1) a ,b and c are in AdotP (2) a ,b and c are in GdotP (3) b ,c and a are in GdotP (4) b , c and a are in AdotP

If a, b and c are positive real numbers such that aleblec, then (a^(2)+b^(2)+c^(2))/(a+b+c) lies in the interval

If a,b,c are three distinct positive real numbers which are in H.P., then (3a + 2b)/(2a - b) + (3c + 2b)/(2c - b) is

Let a,b,c be three distinct positive real numbers in G.P , then prove that a^(2)+2bc - 3ac gt 0

If a, b,c are three positive real numbers , then find minimum value of (a^(2)+1)/(b+c)+(b^(2)+1)/(c+a)+(c^(2)+1)/(a+b)

If a,b,c,d are positive real numbers such that (a)/(3) = (a+b)/(4)= (a+b+c)/(5) = (a+b+c+d)/(6) , then (a)/(b+2c+3d) is:-

If a , b ,c are three distinct positive real numbers in G.P., then prove that c^2+2a b >3a cdot

If a,b,c are three distinct positive real numbers in G.P., than prove that c^2+2ab gt 3ac .