Question 1

Find the sum \[\sum_{k = 1}^{2004} \frac{1}{1 + \tan^2 (\frac{k \pi}{2 \cdot 2005})}.\]

Question 2

Answer:1002

Explanation:

$\Rightarrow \sum_(k=1)^(2004)\left ( (1)/(1+\tan ^2\left ( (k\pi )/(2\cdot 2005)\right ))\right )$

and
$1+\tan ^2\theta =\sec^2\theta$

and
$\cos \theta =(1)/(\sec \theta )$

$\Rightarrow \sum_(k=1)^(2004)\left ( \cos^2(k\pi )/(2\cdot 2005)\right )$

as
$\cos ^2\theta =\cos ^2(\pi -\theta )$

Applying this we get

$\Rightarrow \sum_(1)^(1002)\left [ \cos^2\left ( (k\pi )/(2\cdot 2005)\right )+\cos^2\left ( ((2005-k)\pi )/(2\cdot 2005)\right )\right ]$

every
$\theta$ there exist
$\pi -\theta$

such that
$\sin^2\theta +\cos^2\theta =1$

therefore

$\Rightarrow \sum_(1)^(1002)\left [ \cos^2\left ( (k\pi )/(2\cdot 2005)\right )+\cos^2\left ( ((2005-k)\pi )/(2\cdot 2005)\right )\right ]=1002$

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