The correct option is D a2,b3,c5 are sides of a right angled triangle
a,b,c are in H.P.
1a,1b,1c are in A.P.
1a+1b+1c=14⇒3b=14(∵1a+1c=2b)⇒b=12
Now,
a+b+c=37⇒a+c=25⋯(1)
We know that,
b=2aca+c⇒12=2ac25⇒ac=150
Using equation (1),
⇒a(25−a)=150⇒a2−25a+150=0⇒(a−10)(a−15)=0⇒a=10(∵a<b<c)⇒c=15
a,b,c−1
=10,12,14 are in A.P.
a−4,b,c+9
=6,12,24 are in G.P.
A.M. of a,b
=a+b2=11
a2,b3,c5
=5,4,3 are sides of a right angled triangle.