Let a and b be positive real numbers. If a,A1,A2,b are in arithmetic progression, a,G1,G2,b are in geometric progression and a,H1,H2,B are in harmonic progression, then show that (G1G2/H1H2)=(A1+A2/H1+H2)= ((2a+b)(a+2b)/9ab)

Question

Let a and b be positive real numbers. If a,A1,A2,b are in arithmetic progression, a,G1,G2,b are in geometric progression and a,H1,H2,B are in harmonic progression, then show that (G1G2/H1H2)=(A1+A2/H1+H2)= ((2a+b)(a+2b)/9ab) (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Since, a,A1,A2,b are in AP. ⇒ A1+A2 = a+b a,G1,G2,b are in GP ⇒ G1G2 = ab and a,H1,H2,b are in HP. ⇒ H1 = (3ab/2b+a),H2 = (3ab/b+2a) ∴ (1/H1)+ (1/H2)= (1/a)+(1/b) ⇒ (H1+ H2/H1 H2) = (A1+A2/G1G2)= (1/a)+(1/b) ...(i) Now, (G1G2/H1 H2) = (ab/((3ab)2b+a)+((3ab)b+2a) = ((2a+b) (a+2b)/9ab) ...(ii) From Eqs. (i) and (ii), we get (G1G2/H1 H2) = (A1+A2/H1+ H2) = ((2a+b) (a+2b)/9ab)

Q. Let a and b be positive real numbers. If a,A1​,A2​,b are in arithmetic progression, a,G1​,G2​,b are in geometric progression and a,H1​,H2​,B are in harmonic progression, then show that H1​H2​G1​G2​​=H1​+H2​A1​+A2​​=9ab(2a+b)(a+2b)​