If a,b,c are in H.P. , then

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

If a,b,c,d are in H.P., then ab+bc+cd is equal to

Assertion: x-a,y-a,z-a are in G.P., Reason: If a,b,c are in H.P. then a- b/2, b- b/2, c- b/2 are in G.P. (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.

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

If a,b,c ,d are in H.P., then show that ab + bc + cd =3ad

If a ,b ,c are in A.P., the a/(b c),1/c ,1/b will be in a. A.P b. G.P. c. H.P. d. none of these

If positive numbers a ,b ,c are in H.P., then equation x^2-k x+2b^(101)-a^(101)-c^(101)=0(k in R) has (a)both roots positive (b)both roots negative (c)one positive and one negative root (d)both roots imaginary

If positive numbers a ,b ,c are in H.P., then equation x^2-k x+2b^(101)-a^(101)-c^(101)=0(k in R) has (a)both roots positive (b)both roots negative (c)one positive and one negative root (d)both roots imaginary

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 .

Statement - 1 : If non-zero numbers a , b , c are in H.P. , then the equation (x)/(a) + (y)/(b) = (1)/(c) represents a family of concurrent lines . Statement- 2 : A linear equation px + qy = 1 in x , y represents a family of straight lines passing through a fixed point iff there is a linear relation between p and q .