Question

If n geometric means between a and b be $G_1,G_2,.......G_n$ and a geometric mean be G, then the true relation is

• A. $G_1.G_2.......G_n=G$
• B. $G_1.G_2.......G_n=G^{1/n}$
• C. $G_1.G_2.......G_n=G^n$
• D. $G_1.G_2.......G_n=G^{2/n}$

Answer 1

The correct option is C $G_1.G_2.......G_n=G^n$

Here $G=(ab{)}^{1/2}and{G}_1=a{r}^1,G_2=a{r}^2,......G_n=a{r}^n$
Therefore $G_1.G_2.G_3......G_n=a^n{r}^{1+2+....+n}=a^n{r}^{n(n+1)/2}$
But $a{r}^{n+1}=b\Rightarrow r={\left(\frac{b}{a}\right)}^{1/(n+1)}$
Therefore, the required product is
$a^n{\left(\frac{b}{a}\right)}^{1/(n+1).n(n+1)/2}=(ab{)}^{n/2}=\{(ab{)}^{1/2}{\}}^n=G^n.$