Calculating $f_n(\theta)$ for Positive Integers $n$

sbhatnagar · Sep 8, 2012

For a positive integer $n$, let

$$f_n(\theta)=\tan \frac{\theta}{2}(1+\sec \theta)(1+\sec 2\theta)(1+\sec 4 \theta)\cdots (1+\sec2^n \theta)$$

Find the value of

(i) $f_2 \left(\dfrac{\pi}{16} \right)$

(ii) $f_3 \left(\dfrac{\pi}{32} \right)$

(iii) $f_4 \left(\dfrac{\pi}{64} \right)$

(iv) $f_5 \left(\dfrac{\pi}{128} \right)$

Sudharaka · Sep 8, 2012

sbhatnagar said:

For a positive integer $n$, let

$$f_n(\theta)=\tan \frac{\theta}{2}(1+\sec \theta)(1+\sec 2\theta)(1+\sec 4 \theta)\cdots (1+\sec2^n \theta)$$

Find the value of

(i) $f_2 \left(\dfrac{\pi}{16} \right)$

(ii) $f_3 \left(\dfrac{\pi}{32} \right)$

(iii) $f_4 \left(\dfrac{\pi}{64} \right)$

(iv) $f_5 \left(\dfrac{\pi}{128} \right)$

Hi sbhatnagar, :)

It can be shown by mathematical induction that,

\[f_n(\theta)=\tan{2^{n}\theta}\mbox{ where }n\in\mathbb{Z}^{+}\]

Therefore,

\[f_2 \left(\dfrac{\pi}{16} \right)=f_3 \left(\dfrac{\pi}{32} \right)=f_4 \left(\dfrac{\pi}{64} \right)=f_5 \left(\dfrac{\pi}{128} \right)=\tan\left(\frac{\pi}{4}\right)=1\]

Kind Regards,
Sudharaka.

Calculating $f_n(\theta)$ for Positive Integers $n$

Related to Calculating $f_n(\theta)$ for Positive Integers $n$

1. What is the formula for calculating $f_n(\theta)$?

2. How does $n$ affect the value of $f_n(\theta)$?

3. Can $f_n(\theta)$ be negative for any values of $n$ and $\theta$?

4. Are there any special values of $n$ or $\theta$ that result in a simplified form of $f_n(\theta)$?

5. How is $f_n(\theta)$ used in real-world applications?

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