When answering these questions, remember that recursion is not simply ``repeating'' a task over and over. That could be done by a loop. A loop isn't recursion. Recursion is anything that is defined in terms of itself.

- ``To understand recursion, one must first understand recursion.'' Explain the joke. (Make sure to ask if you don't get this or the ones below.)
- Two mirrors face each other. Explain how their reflections demonstrate the property of recursion.
- Explain how Multi-Level Marketing (MLM) uses recursion. If you don't know what MLM is, look it up. Also, pro-life tip: avoid MLM.
- Explain how the ``sweep'' function in the classic minesweeper game could be done with recursion. If you don't know, ask!
- Explain how finding your way out of a maze could be done with recursion.
- Use the Chrome browser and create your own screenshot at:

http://juliamap.googlelabs.com

Use your mouse and mouse wheel to zoom into an interesting part of the fractal. Copy the URL and paste it here. - (5 pts) Write a recursive function
`f(n)`that takes in a value*n*and returns the value for`f`, given the definition below. (If you are viewing this in a text file, the line below will look like gibberish. Go on-line or look in the book for the correctly formatted equation.)

$f_{n} = \begin{cases} 6 & \text{if } n = 1, \\ \frac{1}{2}f_{n-1}+4 & \text{if } n > 1. \end{cases}$

Then write a`for`loop that prints out the answers for values of n from 1 to 10. It should look like:n= 1 , a= 6 n= 2 , a= 7.0 n= 3 , a= 7.5 n= 4 , a= 7.75 n= 5 , a= 7.875 n= 6 , a= 7.9375 n= 7 , a= 7.96875 n= 8 , a= 7.984375 n= 9 , a= 7.9921875 n= 10 , a= 7.99609375

The function should not have any print statements inside it, nor a loop. The`for`loop that is written should be outside the function and call the function to get the results and print them. - (5 pts) Write recursive code that will print out the first 10 terms of the
sequence below. (If you are viewing this in a text file, the line below will
look like gibberish. Go on-line or look in the book for the correctly formatted
equation.)

$f_{n} = \begin{cases} 1 & \text{if } n = 1, \\ 1 & \text{if } n = 2, \\ f(n-1)+f(n-2) & \text{if } n > 2. \end{cases}$

Copyright © 2017

English version by Paul Vincent Craven

Spanish version by Antonio Rodríguez Verdugo

Russian version by Vladimir Slav

Turkish version by Güray Yildirim

Portuguese version by Armando Marques Sobrinho and Tati Carvalho

Dutch version by Frank Waegeman

Hungarian version by Nagy Attila

Finnish version by Jouko Järvenpää

French version by Franco Rossi

Korean version by Kim Zeung-Il

Chinese version by Kai Lin

English version by Paul Vincent Craven

Spanish version by Antonio Rodríguez Verdugo

Russian version by Vladimir Slav

Turkish version by Güray Yildirim

Portuguese version by Armando Marques Sobrinho and Tati Carvalho

Dutch version by Frank Waegeman

Hungarian version by Nagy Attila

Finnish version by Jouko Järvenpää

French version by Franco Rossi

Korean version by Kim Zeung-Il

Chinese version by Kai Lin