x=∑n=0∞an=1−a1y=∑n=0∞bn=1−b1⇒a=1−x1⇒b=1−y1 z=n=0∑∞cn=1−c1⇒c=1−z1a,b,c are in A.P. 2b=a+c2(1−y1)=1−x1+1−y1y2=x1+z1⇒x,y,z are in H.P.
If x=n=0∑∞an,y=n=0∑∞bn,z=n=0∑∞cn where a,b,c are in A.P. and ∣a∣<1,∣b∣<1,∣c∣<1, then x,y,z are in
Held on 30 Apr 2005 · Verified 6 Jul 2026.
G.P.
A.P.
Arithmetic - Geometric Progression
H.P.
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