# Base conversion in python

I need help to understand this question. Please don't post the answer, only the ways to solve it.

Assign `10` to the variable `base`. Assign the set `{0,1,2,3,4,5,6,7,8,9}` to the variable `digits`. Now write an expression using a comprehension and `base` and `digits` whose value is the set of all at-most- three-digit numbers. Your expression should work for any base. For example, if you instead assign `2` to base and assign `{0,1}` to digits, the value of your expression should be `{0,1,2,3,4,5,6,7}` because this is the set of numbers that, base two, have at most three digits.

I try this expression but I could not solve the base 2 question.

``````base = 10
digits = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}
{(x*(base**2))+(y*(base**1))+(z*(base**0)) for x in digits for y in digits for z in digits if (x*(base**2))+(y*(base**1))+(z*(base**0))>((y*(base**1))+(z*(base**0)))}
``````
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I would recomend finding the largest value in the set of digits. I would then just do `range(int('%s%s%s'%(max_digit,max_digit_max_digit),base)+1)` but that probably isnt what your teacher wants – Joran Beasley Jul 8 '13 at 20:13
I need to come up with a comprehension that return a {100-999} set for decimals and the same expression should work with any base ex: 2,8 16... – Rodrigo Camargos Jul 8 '13 at 20:20
I recognise this question as being from the Coursera matrix/linear algebra course. You should really look on the course discussion board there, rather than asking for help here. – Daniel Roseman Jul 8 '13 at 20:27
your code seems to work fine ... "At most 3 characters" not "exactly 3 characters" ... just get rid of the `if` in the comprehension – Joran Beasley Jul 8 '13 at 20:27
Actually you need to come up with a generator that will give you all the three digit numbers in the range 001 to MMM where M is max digit this will automatically include the one and two digit numbers by allowing leading 0s. The other hints look at the output of python -c "print help(int)"... – Steve Barnes Jul 8 '13 at 20:29

...whose value is the set of all at-most- three-digit numbers.

Emphasis added. You need to include the values `000` - `099` (for `base = 10`).

It looks like you've almost got it. You don't need a filter in your comprehension. Think about how many results you'll get from `for x in digits for y in digits for z in digits` for different values in `digits`. It should be exactly the right number of values.

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You already had the answer, simply remove the `if` statement. Try this:

``````{x*base**2+y*base**1+z*base**0 for x in digits for y in digits for z in digits}
``````

If you use base 10 and digits (0,1,2,3,4,5,6,7,8,9) you should get a list from from 0 to 999. And if you use base 2 and digits (0,1) you should get a list from 0 to 7.

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As I guess your homework is done, almost two years later:

The number of 3 digits number within your base is a sequence of the form

``````base^digits
``````

For example, to have the number of 3-digits numbers in base ten, one would type in python:

``````10**3
``````

You then can use the range function to have them all:

``````{x for x in range(10**3)}
``````

This works with any base.

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