5.4. The random module

We often want to use random numbers in programs. Here are a few typical uses:

Python provides a module random that helps with tasks like this. You can take a look at it in the documentation. Here are the key things we can do with it.

Press the run button a number of times. Note that the values change each time. These are random numbers.

The randrange function generates an integer between its lower and upper argument, using the same semantics as range — so the lower bound is included, but the upper bound is excluded. All the values have an equal probability of occurring (i.e. the results are uniformly distributed).

The random() function returns a floating point number in the range [0.0, 1.0) — the square bracket means “closed interval on the left” and the round parenthesis means “open interval on the right”. In other words, 0.0 is possible, but all returned numbers will be strictly less than 1.0. It is usual to scale the results after calling this method, to get them into a range suitable for your application.

In the case shown here, we’ve converted the result of the method call to a number in the range [0.0, 5.0). Once more, these are uniformly distributed numbers — numbers close to 0 are just as likely to occur as numbers close to 0.5, or numbers close to 1.0. If you continue to press the run button you will see random values between 0.0 and up to but not including 5.0.

It is important to note that random number generators are based on a deterministic algorithm — repeatable and predictable. So they’re called pseudo-random generators — they are not genuinely random. They start with a seed value. Each time you ask for another random number, you’ll get one based on the current seed attribute, and the state of the seed (which is one of the attributes of the generator) will be updated. The good news is that each time you run your program, the seed value is likely to be different meaning that even though the random numbers are being created algorithmically, you will likely get random behavior each time you execute.


  • Sine Wave In this guided lab exercise we will have the turtle plot a sine wave.

Check your understanding

    modules-4-1: Which of the following is the correct way to reference the value pi within the math module. Assume you have already imported the math module.
  • math.pi
  • To invoke or reference something contained in a module you use the dot (.) notation.
  • math(pi)
  • This is the syntax for calling a function, not referencing an item in a module.
  • pi.math
  • The module name must come first when accessing values and functions with a module.
  • math->pi
  • The -> notation is not used in Python.
    modules-4-2: Which module would you most likely use if you were writing a function to simulate rolling dice?
  • the math module
  • While you might want to use the math module for other numerical computations in your program, it does not contain functions that are likely to help you simulate a dice roll.
  • the random module
  • You would likely call the function random.randrange.
  • the turtle module
  • The turtle module, while producing interesting graphics, is unlikely to help you here.
  • the game module
  • Python does not have a game module.
    modules-4-3: The correct code to generate a random number between 1 and 100 (inclusive) is:
  • prob = random.randrange(1, 101)
  • This will generate a number between 1 and 101, but does not include 101.
  • prob = random.randrange(1, 100)
  • This will generate a number between 1 and 100, but does not include 100. The highest value generated will be 99.
  • prob = random.randrange(0, 101)
  • This will generate a number between 0 and 100. The lowest value generated is 0. The highest value generated will be 100.
  • prob = random.randrange(0, 100)
  • This will generate a number between 0 and 100, but does not include 100. The lowest value generated is 0 and the highest value generated will be 99.
    modules-4-4: One reason that lotteries don’t use computers to generate random numbers is:
  • There is no computer on the stage for the drawing.
  • They could easily put one there.
  • Because computers don't really generate random numbers, they generate pseudo-random numbers.
  • Computers generate random numbers using a deterministic algorithm. This means that if anyone ever found out the algorithm they could accurately predict the next value to be generated and would always win the lottery.
  • They would just generate the same numbers over and over again.
  • This might happen if the same seed value was used over and over again, but they could make sure this was not the case.
  • The computer can't tell what values were already selected, so it might generate all 5's instead of 5 unique numbers.
  • While a programmer would need to ensure the computer did not select the same number more than once, it is easy to ensure this.


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