Learning Python 3 with the Linkbot/Advanced Functions Example
Some people find this section useful, and some find it confusing. If you find it confusing you can skip it. Now we will do a walk through for the following program:
def mult(a, b):
if b == 0:
return 0
rest = mult(a, b - 1)
value = a + rest
return value
print("3 * 2 = ", mult(3, 2))
Basically this program creates a positive integer multiplication function (that is far slower than the built in multiplication function) and then demonstrates this function with a use of the function. This program demonstrates the use of recursion, that is a form of iteration (repetition) in which there is a function that repeatedly calls itself until an exit condition is satisfied. It uses repeated additions to give the same result as mutiplication: e.g. 3 + 3 (addition) gives the same result as 3 * 2 (multiplication).
- Question: What is the first thing the program does?
- Answer: The first thing done is the function mult is defined with the lines:
def mult(a, b):
if b == 0:
return 0
rest = mult(a, b - 1)
value = a + rest
return value
- This creates a function that takes two parameters and returns a value when it is done. Later this function can be run.
- What happens next?
- The next line after the function,
print("3 * 2 = ", mult(3, 2))
is run. - And what does this do?
- It prints
3 * 2 =
and the return value ofmult(3, 2)
- And what does
mult(3, 2)
return? - We need to do a walkthrough of the
mult
function to find out. - What happens next?
- The variable
a
gets the value 3 assigned to it and the variableb
gets the value 2 assigned to it. - And then?
- The line
if b == 0:
is run. Sinceb
has the value 2 this is false so the linereturn 0
is skipped. - And what then?
- The line
rest = mult(a, b - 1)
is run. This line sets the local variablerest
to the value ofmult(a, b - 1)
. The value ofa
is 3 and the value ofb
is 2 so the function call ismult(3,1)
- So what is the value of
mult(3, 1)
? - We will need to run the function
mult
with the parameters 3 and 1. - So what happens next?
- The local variables in the new run of the function are set so that
a
has the value 3 andb
has the value 1. Since these are local values these do not affect the previous values ofa
andb
. - And then?
- Since
b
has the value 1 the if statement is false, so the next line becomesrest = mult(a, b - 1)
. - What does this line do?
- This line will assign the value of
mult(3, 0)
to rest. - So what is that value?
- We will have to run the function one more time to find that out. This time
a
has the value 3 andb
has the value 0. - So what happens next?
- The first line in the function to run is
if b == 0:
.b
has the value 0 so the next line to run isreturn 0
- And what does the line
return 0
do? - This line returns the value 0 out of the function.
- So?
- So now we know that
mult(3, 0)
has the value 0. Now we know what the linerest = mult(a, b - 1)
did since we have run the functionmult
with the parameters 3 and 0. We have finished runningmult(3, 0)
and are now back to runningmult(3, 1)
. The variablerest
gets assigned the value 0. - What line is run next?
- The line
value = a + rest
is run next. In this run of the function,a = 3
andrest = 0
so nowvalue = 3
. - What happens next?
- The line
return value
is run. This returns 3 from the function. This also exits from the run of the functionmult(3, 1)
. Afterreturn
is called, we go back to runningmult(3, 2)
. - Where were we in
mult(3, 2)
? - We had the variables
a = 3
andb = 2
and were examining the linerest = mult(a, b - 1)
. - So what happens now?
- The variable
rest
get 3 assigned to it. The next linevalue = a + rest
setsvalue
to3 + 3
or 6. - So now what happens?
- The next line runs, this returns 6 from the function. We are now back to running the line
print("3 * 2 = ", mult(3, 2))
which can now print out the 6. - What is happening overall?
- Basically we used two facts to calculate the multiple of the two numbers. The first is that any number times 0 is 0 (
x * 0 = 0
). The second is that a number times another number is equal to the first number plus the first number times one less than the second number (x * y = x + x * (y - 1)
). So what happens is3 * 2
is first converted into3 + 3 * 1
. Then3 * 1
is converted into3 + 3 * 0
. Then we know that any number times 0 is 0 so3 * 0
is 0. Then we can calculate that3 + 3 * 0
is3 + 0
which is3
. Now we know what3 * 1
is so we can calculate that3 + 3 * 1
is3 + 3
which is6
.
This is how the whole thing works:
3 * 2 3 + 3 * 1 3 + 3 + 3 * 0 3 + 3 + 0 3 + 3 6
Recursion
[edit | edit source]Programming constructs solving a problem by solving a smaller version of the same problem are called recursive. In the examples in this chapter, recursion is realized by defining a function calling itself. This facilitates implementing solutions to programming tasks as it may be sufficient to consider the next step of a problem instead of the whole problem at once. It is also useful as it allows to express some mathematical concepts with straightforward, easy to read code.
Any problem that can be solved with recursion could be re-implemented with loops. Using the latter usually results in better performance. However equivalent implementations using loops are usually harder to get done correctly.
Probably the most intuitive definition of recursion is:
- Recursion
- If you still don't get it, see recursion.
Try walking through the factorial example if the multiplication example did not make sense.
Examples
[edit | edit source]factorial.py
#defines a function that calculates the factorial
def factorial(n):
if n <= 1:
return 1
return n * factorial(n - 1)
print("2! =", factorial(2))
print("3! =", factorial(3))
print("4! =", factorial(4))
print("5! =", factorial(5))
Output:
2! = 2 3! = 6 4! = 24 5! = 120
countdown.py
def count_down(n):
print(n)
if n > 0:
return count_down(n-1)
count_down(5)
Output:
5 4 3 2 1 0