The geometric mean of the observations x1, x2, x3, … xn is G1. The geometric mean of the observations y1, y2, y3,… yn is G2. The geometric mean of observations $\frac{{{{\rm{x}}_1}}}{{{{\rm{y}}_1}}},\frac{{{{\rm{x}}_2}}}{{{{\rm{y}}_2}}},\frac{{{{\rm{x}}_3}}}{{{{\rm{y}}_3}}}, \ldots \frac{{{{\rm{x}}_{\rm{n}}}}}{{{{\rm{y}}_{\rm{n}}}}}$ is

Question

The geometric mean of the observations x1, x2, x3, … xn is G1. The geometric mean of the observations y1, y2, y3,… yn is G2. The geometric mean of observations $\frac{{{{\rm{x}}_1}}}{{{{\rm{y}}_1}}},\frac{{{{\rm{x}}_2}}}{{{{\rm{y}}_2}}},\frac{{{{\rm{x}}_3}}}{{{{\rm{y}}_3}}}, \ldots \frac{{{{\rm{x}}_{\rm{n}}}}}{{{{\rm{y}}_{\rm{n}}}}}$ is

TuteeHUB · Accepted Answer

${\rm{In}}\left( {\frac{{{{\rm{G}}_1}}}{{{{\rm{G}}_2}}}} \right)$

TuteeHUB · Answer

G1G2

TuteeHUB · Answer

In(G1G2)

TuteeHUB · Answer

$\frac{{{{\rm{G}}_1}}}{{{{\rm{G}}_2}}}$

1.	The geometric mean of the observations x1, x2, x3, … xn is G1. The geometric mean of the observations y1, y2, y3,… yn is G2. The geometric mean of observations \(\frac{{{{\rm{x}}_1}}}{{{{\rm{y}}_1}}},\frac{{{{\rm{x}}_2}}}{{{{\rm{y}}_2}}},\frac{{{{\rm{x}}_3}}}{{{{\rm{y}}_3}}}, \ldots \frac{{{{\rm{x}}_{\rm{n}}}}}{{{{\rm{y}}_{\rm{n}}}}}\) is
A.	G1G2
B.	In(G1G2)
C.	\(\frac{{{{\rm{G}}_1}}}{{{{\rm{G}}_2}}}\)
D.	\({\rm{In}}\left( {\frac{{{{\rm{G}}_1}}}{{{{\rm{G}}_2}}}} \right)\)
Answer» D. \({\rm{In}}\left( {\frac{{{{\rm{G}}_1}}}{{{{\rm{G}}_2}}}} \right)\)

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