STATEMENT-1 : For three positive unantities a , b,c are in H.P., we must have `a^(2008) + c^(2008) gt 2b^(2008) ` and
STATEMENT-2 : `A.M.ge G.M. ge H.M. ` for positive numbers

If three positive unequal numbers a, b, c are in H.P., then

If a,b,c three unequal positive quantities in H.P .then

If positive quantities a,b,c are in H.P. , then which of the following is not true ?

STATEMENT-1 : If a^(x) = b^(y) = c^(z) , where x,y,z are unequal positive numbers and a, b,c are in G.P. , then x^(3) + z^(3) gt 2y^(3) and STATEMENT-2 : If a, b,c are in H,P, a^(3) + c^(3) ge 2b^(3) , where a, b, c are positive real numbers .

If three positive real numbers a,b,c, (cgta) are in H.P., then log(a+c)+log(a-2b+c) is equal to

If three positive numbers a, b, c are in A.P. and 1/a^2,1/b^2,1/c^2 also in A.P. then

STATEMENT-1 : For n ne N, n gt 1 , 2^(n) gt 1 n ^((n-1)/(2)) and STATEMENT-2 : A.M. of distinct positive number is greater then G.M.

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

If distinct and positive quantities a ,b ,c are in H.P. then (a) b/c= (a-b)/(b-c) (b) b^2>ac (c) b^2< ac (d) a/c=(a-b)/(b-c)

Statement -1: If a,b,c are distinct real numbers in H.P, then a^(n)+c^(n)gt2b^(n)" for all "ninN . Statement -2: AMgtGMgtHM