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Logarithms

If x1 and x2 ...

Question

If $x_{1}$ and $x_{2}$ are two real solutions of the equation $(x)^{ln x^{2}} = e^{18},$ then the product $(x_{1} . x_{2})$ equals

\frac{({cot}^{2} 5^{\circ}) ({cos}^{2} 5^{\circ})}{{cot}^{2} 5^{\circ} - {cos}^{2} 5^{\circ}}

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\frac{({tan}^{2} 10^{\circ}) ({sin}^{2} 10^{\circ})}{{tan}^{2} 10^{\circ} - {sin}^{2} 10^{\circ}}

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sec 0 + sec \frac{π}{7} + sec \frac{2 π}{7} + sec \frac{3 π}{7} + sec \frac{4 π}{7} + sec \frac{5 π}{7} + sec \frac{6 π}{7} = 1

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\sqrt{1 - {sin}^{2} 110^{\circ}} \cdot sec 110^{\circ}

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Solution

The correct option is C $sec 0 + sec \frac{π}{7} + sec \frac{2 π}{7} + sec \frac{3 π}{7} + sec \frac{4 π}{7} + sec \frac{5 π}{7} + sec \frac{6 π}{7} = 1$
$(x)^{ln x^{2}} = e^{18}$
$\Rightarrow ln x^{2} \times ln x = 18$
$\Rightarrow 2 (ln x)^{2} = 18$
$\Rightarrow (ln x)^{2} = 9 \Rightarrow (ln x) = \pm 3$
$\Rightarrow x_{1} = e^{3}, x_{2} = e^{- 3}$
$∴ x_{1} . x_{2} = 1$

Now,
$\frac{({cot}^{2} 5^{\circ}) ({cos}^{2} 5^{\circ})}{{cot}^{2} 5^{\circ} - {cos}^{2} 5^{\circ}} = \frac{{cos}^{4} 5^{\circ}}{{cos}^{2} 5^{\circ} (1 - {sin}^{2} 5^{\circ})} = 1$

$\frac{({tan}^{2} 10^{\circ}) ({sin}^{2} 10^{\circ})}{{tan}^{2} 10^{\circ} - {sin}^{2} 10^{\circ}} = \frac{{sin}^{4} 10^{\circ}}{{sin}^{2} 10^{\circ} (1 - {cos}^{2} 10^{\circ})} = 1$

$sec 0 + sec \frac{π}{7} + sec \frac{2 π}{7} + sec \frac{3 π}{7} + sec \frac{4 π}{7} + sec \frac{5 π}{7} + sec \frac{6 π}{7}$
$= 1 - sec \frac{6 π}{7} - sec \frac{5 π}{7} - sec \frac{4 π}{7} + sec \frac{4 π}{7} + sec \frac{5 π}{7} + sec \frac{6 π}{7} = 1$

$\sqrt{1 - {sin}^{2} 110^{\circ}} \cdot sec 110^{\circ}$
$= | cos 110^{\circ} | \times sec 110^{\circ} = - cos 110^{\circ} \times sec 110^{\circ} = - 1$

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