Chapter 5.5, Problem 67E

To determine

To explain the reason for which the result in the calculator is always an integral multiple of $\pi$ , with the given conditions.

Answer to Problem 67E

By using the Newton’s method for roots of sin function one obtains

  $\begin{array}{l}{x}_{n+1}=x_n-\frac{\sin x_n}{\cos x_n}\\ =x_n-\tan x_n\end{array}$

Which is the recurrence relation $X\to X-\tan \left(X\right)$ entered in the computer.

On the other hand the root of $\sin X=0$ are multiple of $\pi ,\text{i}\text{.e}\text{.,}{X}_n=n\pi$

Then the computer will return that multiple of $\pi$ which is closest to entered value of X .

Explanation of Solution

Given information:

The given statement is that store any number as X in your calculator. Then enter the command $X-\tan \left(X\right)\to X$ and press the ENTER key repeatedly until the displayed value stops changing.

By using the Newton’s method for roots of sin function one obtains

  $\begin{array}{l}{x}_{n+1}=x_n-\frac{\sin x_n}{\cos x_n}\\ =x_n-\tan x_n\end{array}$

Which is the recurrence relation $X\to X-\tan \left(X\right)$ entered in the computer.

On the other hand the root of $\sin X=0$ are multiple of $\pi ,\text{i}\text{.e}\text{.,}{X}_n=n\pi$

Then the computer will return that multiple of $\pi$ which is closest to entered value of X .