MCQ
If ${G_1}$ and ${G_2}$ are two geometric means and $A$ the arithmetic mean inserted between two numbers, then the value of $\frac{{G_1^2}}{{{G_2}}} + \frac{{G_2^2}}{{{G_1}}}$is
- A$\frac{A}{2}$
- B$A$
- ✓$2A$
- DNone of these
$\therefore \,\,{G_1} = {p^{2/3}}\,\,{q^{1/3}},\,\,{G_2} = {p^{1/3}}\,\,\,{q^{2/3}}$
$\therefore \,\frac{{G_1^2}}{{{G_2}}} + \frac{{G_2^2}}{{{G_1}}} = \frac{{{p^{4/3}}\,\,{q^{2/3}}}}{{{p^{1/3}}\,\,{q^{2/3}}}} + \frac{{{p^{2/3}}\,{q^{4/3}}}}{{{p^{2/3}}\,{q^{1/3}}}}$
$ = p + q = 2 \times \,\left( {\frac{{p + q}}{2}} \right)\, = 2A$.
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$(I)$ $Trace(\mathrm{R})=0$
$(II) $If $trace(\operatorname{adj}(\operatorname{adj}(\mathrm{R}))=0$, then $R$ has exactly one non-zero entry.