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# ASCII art in Python [UPDATED]

I'm pretty new to python, picked it up as an hobby interest, and through some searching found myself a bunch of exercises from "The Practice of computing", one of them asks about writing an ASCII figure, like the one denoted below.

It all seems like an easy enough exercise, but i can't seem wrap my head around the use of a number to draw this, the exercise states that the above drawing was drawn through use of the number "1".

It also states that no number under 0 or above 100 can or should be used to create an ASCII drawing.

Here's another example :

The input here was the number "2".

I've found a way to make the first image appear, but not through any use of the given numbers in any way, just a simple "else" inside a while loop so i could filter out the numbers that are below or equal to 0 and higher or equal to 100.

I've hit a dead stop, any help is appreciated.

My code as stated above that does not use the variable number to create the first drawing :

``````while True:
s = input("Give me a number to make a drawing with that is between 0 and 100: ")

if not s.isdigit():
print ("Error, only numbers will make this program run.")
continue #Try Again but with a number this time

if int(s) >= 100:
print ("The number is bigger than or equal to 100 and won't work. \nDo try again.")
continue #try again

if int(s) <= 0:
print ("The number is smaller than or equal to 0 and won't work. \nDo try again.")
continue #try again

else:
print ("%5s" %("*" *3),"\n"'%5s' %("* *"),"\n" '%7s' %("*** ***"),"\n" '%7s' %("*     *"),"\n" '%7s' %("*** ***"),"\n" '%5s' %("* *"),"\n" '%5s' %("*" *3))

print ('Want to make another drawing ?')
continue #make another drawing
``````

The excercise states the following :

An ASCII Figure of the size \$n\$ is made up of one or several lines. On each line only spaces and the stars (*) are allowed, after each star on a line no spaces are allowed as such you should end with a "\n" or newline. And then followed by the above stated examples.

My new code example wich is dependant on the variable input : Also, in this code example it is set to trigger when the input is 1, i'm still having problems with "enlarging" the entire drawing when i increase the input number.

``````    while True:

A = input("Give me a number to make a drawing with that is between 0 and 100: ")
b = "***"
c = "*"
d = " "

if not A.isdigit():
print ("Error, only numbers will make this program run.")
continue #Try Again but with a number this time

if int(A) >= 100:
print ("The number is bigger than or equal to 100 and won't work. \nDo try again.")
continue #try again

if int(A) <= 0:
print ("The number is smaller than or equal to 0 and won't work. \nDo try again.")
continue #try again

else :
range(1,99)
if int(A) == (1) :
print ((d *((int(A))*2)) + b,)
print ((d *((int(A))*2))+ c + d + c,)
print ((d *((int(A))*0))+ b + d + b,)
print ((d *((int(A))*0))+ c + d*5 + c,)
print ((d *((int(A))*0))+ b + d + b,)
print ((d *((int(A))*2))+ c + d + c,)
print ((d *((int(A))*2)) + b,)

continue #try again
``````

But i've still got a problam with "growing" the number of spaces inside the ASCII figure alongside the increase of 1 to 2.

As i've got a problem with line 3 as well, because it needs to be denoted along the sides of the console, it should have a spacing of 0 from the side, but it must increase to a spacing of 2 with the number 2.

-
I think it would help if we got the whole exercise – Sindre Johansen Oct 25 '12 at 20:04
The excercise states the following : An ASCII Figure of the size \$n\$ is made up of one or several lines. On each line only spaces and the stars (*) are allowed, after each star on a line no spaces are allowed as such you should end with a "\n" or newline. And then followed by the above stated examples. – Beaver Oct 25 '12 at 20:07
I found this for banners. Also here. – f p Oct 25 '12 at 20:09
@fp: for banners, see Is there a python library that allows to easily print ascii-art text?. But it is unrelated to current question – J.F. Sebastian Oct 25 '12 at 20:22
@fp Yes, i've found those before but one of them has a seeming syntax error in "tabl"e and the other one is not nearly the same as mine. But still any help or hint is always appreciated. – Beaver Oct 25 '12 at 20:23

Think about the difference between 1 and 2. Try to draw by hand what 3 and 4 should look like to make the sequence work. Think about it like one of those problems where you are given the start of a sequence and you have to work our the rest.

Like:

0 1 1 2 3 5 8 13

If you don't recognize that right off, it is the Fibonacci sequence. Once you figure out the pattern you can write an arbitrarily long sequence of the values.

1)

``````#
``````

2)

``````##
#
``````

3)

``````###
##
#
``````

What does 4) look like?

Or another ascii sequence:

1)

``````#
``````

2)

`````` #
# #
#
``````

3)

``````  #
# #
#   #
# #
#
``````

What is (4)?

If it still doesn't make sense, try designing a few recursive shapes of your own which are a little similar to the one you are trying to figure out (maybe something along the lines of my second example). Don't worry about how to code it for now, just worry about what the output should be. Then look at the patterns and come out with an algorithm.

-
+1 good answer :-) – Aniket Oct 25 '12 at 20:07
Yes, this is easily understandable but the sequence in my excersise seems to again and again elude me, i can feel just out of grasp. Also the thing that rattles my cage is how i could "grow" the spacing between the stars to suit "2". – Beaver Oct 25 '12 at 20:17
Does my additional example help? – jmh Oct 25 '12 at 20:55
Sadly enough, no. I'm just stuck on the premiss of creating those spaces and stars with that variable number, i mean i don't know how to create ,for example your number 2, those spaces before the first "star" and then having put a "star" after those spaces. – Beaver Oct 25 '12 at 21:06
Do my examples make sense? If so, just try inventing a few more of your own until you get the question example. Otherwise you might want to sleep on it. – jmh Oct 25 '12 at 21:08

First, analyze the figure line-by-line to identify the different types of patterns.

• The cap, which appears only on the top and bottom lines. It is any number of spaces, followed by three stars.
• The wall, which forms vertical sections of the figure. It is any number of spaces, followed by one star, followed by any number of spaces, followed by a star.
• The floor, which forms horizontal sections of the figure. It is any number of spaces, followed by three stars, followed by any number of spaces, followed by three stars.

We can write a function that prints each of these patterns.

``````def cap(spacesBefore):
print " " * spacesBefore + "***"

def wall(spacesBefore, spacesBetween):
print " " * spacesBefore + "*" + " " * spacesBetween + "*"

def floor(spacesBefore, spacesBetween):
print " " * spacesBefore + "***" + " " * spacesBetween + "***"
``````

Next, write code that will display a figure of size, 0, 1, and 2. This should give you insight on how to display a figure of any size.

``````#size 0
cap(0)
wall(0,1)
cap(0)

print "\n"

#size 1
cap(2)
wall(2, 1)
floor(0, 1)
wall(0, 5)
floor(0, 1)
wall(2, 1)
cap(2)

print "\n"

#size 2
cap(4)
wall(4, 1)
floor(2, 1)
wall(2, 5)
floor(0, 5)
wall(0, 9)
floor(0, 5)
wall(2, 5)
floor(2, 1)
wall(4, 1)
cap(4)
``````

Output:

``````***
* *
***

***
* *
*** ***
*     *
*** ***
* *
***

***
* *
*** ***
*     *
***     ***
*         *
***     ***
*     *
*** ***
* *
***
``````

Analyzing the code used to make these figures, some patterns become apparent. For a figure of size N:

• Both end caps have N*2 preceding spaces.
• There are 2*N+1 wall lines.
• There are 2*N floor lines.
• The first and second halves of the figure are mirror images.
• The number of preceding spaces for each wall line begins at N*2, then shrinks by two until it reaches zero; then it grows by two again until it reaches N*2 once more.
• The number of spaces between walls begins at 1, and increases by 4 until it reaches 4*N+1; then it shrinks by four again until it reaches 1 once more.
• The number of preceding spaces for each floor begins at 2N-2, then shrinks by two until it reaches zero; then it grows by two again until it reaches 2N-2 once more.
• The number of spaces between floors begins at 1, and increases by 4 until it reaches 4*N-3; then it shrinks by four again until it reaches 1 once more.

The patterns all grow and shrink at a linear rate, and then shrink and grow at a linear rate. This implies that we should use two `for` loops with opposite conditions, with a little extra code for the caps and central wall.

``````def draw(N):
cap(2*N)
for i in range(N):              #loop from 0 to N-1
wall(2*(N-i), 1+(4*i))
floor(2*(N-i-1), 1+(4*i))
wall(0, 4*N+1)
for i in range(N-1, -1, -1):    #loop from N-1 to 0
floor(2*(N-i-1), 1+(4*i))
wall(2*(N-i), 1+(4*i))
cap(2*N)
``````

Now test the code.

``````for i in range(7,10):
draw(i)
print "\n"
``````

Output:

``````              ***
* *
*** ***
*     *
***     ***
*         *
***         ***
*             *
***             ***
*                 *
***                 ***
*                     *
***                     ***
*                         *
***                         ***
*                             *
***                         ***
*                         *
***                     ***
*                     *
***                 ***
*                 *
***             ***
*             *
***         ***
*         *
***     ***
*     *
*** ***
* *
***

***
* *
*** ***
*     *
***     ***
*         *
***         ***
*             *
***             ***
*                 *
***                 ***
*                     *
***                     ***
*                         *
***                         ***
*                             *
***                             ***
*                                 *
***                             ***
*                             *
***                         ***
*                         *
***                     ***
*                     *
***                 ***
*                 *
***             ***
*             *
***         ***
*         *
***     ***
*     *
*** ***
* *
***

***
* *
*** ***
*     *
***     ***
*         *
***         ***
*             *
***             ***
*                 *
***                 ***
*                     *
***                     ***
*                         *
***                         ***
*                             *
***                             ***
*                                 *
***                                 ***
*                                     *
***                                 ***
*                                 *
***                             ***
*                             *
***                         ***
*                         *
***                     ***
*                     *
***                 ***
*                 *
***             ***
*             *
***         ***
*         *
***     ***
*     *
*** ***
* *
***
``````
-

To find the pattern you could imagine how would turtle draw it. For example, to draw:

``````***
* *
***
``````

• turn right, move forward
• turn right, move forward
• turn right, move forward
• turn right, move forward

As a Python program:

``````import turtle

turtle.right(90); turtle.forward(50)
turtle.right(90); turtle.forward(50)
turtle.right(90); turtle.forward(50)
turtle.right(90); turtle.forward(50)
turtle.exitonclick() # leave GUI open until a click
``````

If we abbreviate "turn right" as `'r'` and "move forward" as `"f"` then the instructions are:

``````'rfrfrfrf'
``````

It is easy to see that it is `'rf' * 4`. Following the same procedure for:

``````  ***
* *
*** ***
*     *
*** ***
* *
***
``````

the instructions are `'rflfrfrflfrfrflfrfrflfrf'` or `'rflfrf' * 4`, where `'l'` stands for "turn left".

The rule that describes both cases for `n` equal to `0` and `1` is:

``````("rf" + "lfrf" * n) * 4
``````

i.e., if `n = 0` then it is `'rf' * 4`, if `n = 1` then it is `('rf' + 'lfrf') * 4`. To check the formula, you could draw it for `n = 2` and compare it with the known answer:

``````    ***
* *
*** ***
*     *
***     ***
*         *
***     ***
*     *
*** ***
* *
***
``````

As a Python program:

``````from turtle import Turtle

def get_romb_program(n):
assert n >= 0
side = "rf" + "lfrf" * n
program = side * 4  # romb has 4 sides
return program

def draw(turtle, n):
assert 0 <= n < 101
commands = {'r': lambda t: t.right(90),  # turn right
'l': lambda t: t.left(90),  # turn left
'f': lambda t: t.forward(2)
}
run(get_romb_program(n), turtle, commands)

def run(program, t, commands):
for c in program:
commands[c](t)

n = 2
t = Turtle()
scr = t.getscreen()
scr.xscale, scr.yscale = [101 // (n + 1)] * 2
draw(t, n)
scr.exitonclick()
``````

To print it as an ascii art, you could use `AsciiTurtle` instead of `turtle.Turtle`:

``````class AsciiTurtle(object):
def __init__(self):
self.path = [(0, 0)]
self.direction = (1, 0)

def forward(self, distance):
x, y = self.path[-1]
for i in range(1, distance + 1):
self.path.append((x + self.direction[0] * i,
y + self.direction[1] * i))

def right(self, angle_ignored):  # 90 degree turn right
self.direction = self.direction[1], -self.direction[0]

def left(self, angle_ignored):  # 90 degree turn left
self.direction = -self.direction[1], self.direction[0]

def show(self):
minx, maxx, maxy, miny = [f(xy[i] for xy in self.path)
for i in [0, 1] for f in [min, max]]
miny, maxy = -miny, -maxy  # upside-down
board = [[' '] * (maxx - minx + 1) for _ in range(maxy - miny + 1)]
for x, y in self.path:
board[-y - miny][x - minx] = '*'
print('\n'.join(''.join(row) for row in board))
``````

### Example

``````n = 5
t = AsciiTurtle()
draw(t, n) # defined above
t.show()
``````

### Output

``````          ***
* *
*** ***
*     *
***     ***
*         *
***         ***
*             *
***             ***
*                 *
***                 ***
*                     *
***                 ***
*                 *
***             ***
*             *
***         ***
*         *
***     ***
*     *
*** ***
* *
***
``````
-