We can solve this problem by using Geometric mean between two given numbers.
Geometric mean between two given numbers :
Let a and b be two given positive numbers and G be the Geometric Mean between them. Then a, G, b are in a G.P.
Thus,
=
(or)
G2 = ab
(or) G =
√ab (Since G > 0)
Inserting n-Geometric means between two given numbers :
Let
G1,G2, ….,
Gn be the n geometric means between two given numbers a and b. Then, a,
G1,G2, ….,
Gn, b are in G.P
Now, b = (n+2)th terms of G.P.
=
arn+1 ; where r is the common ratio
b =
arn+1 rn+1 =
(or) r =
() and
G1 = ar =
a() G2 =
ar2 =
a() ...
Gn =
arn =
a() y using this definition we can find the two geometric means between 1 and 64.
The two geometric means between 1 and 64.
1,
G1,G2, 64 are in G.P
b =
arn+1 ; here , n = 2
b =
ar2+1 =
ar3 ;
here, a = 1 , b = 64
64 =
1×r3 r3 =
43 ∴ r = 4
G1 = ar = 1 × 4 = 4
G2 =
ar2 = 1 ×
42 = 16
Therefore, the two geometric means between 1 and 64 are 4 & 16.