In Python, how do you find the number of digits in an integer?
32 Answers
If you want the length of an integer as in the number of digits in the integer, you can always convert it to string like str(133)
and find its length like len(str(123))
.
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33Of course, if you're looking for the number of digits, this will produce a result that's too large for negative numbers, since it will count the negative sign. Feb 3, 2010 at 5:03
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90Hey, this is a slow solution. I did a factorial of a random 6 digit number, and found its length. This method took 95.891 seconds. And
Math.log10
method took only 7.486343383789062e-05 seconds, approximately 1501388 times faster! Mar 19, 2017 at 16:30 -
9This isn't just slow, but consumes way more memory and can cause trouble in large numbers. use
Math.log10
instead.– PeymanMar 30, 2020 at 8:36 -
7
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4
Without conversion to string
import math
digits = int(math.log10(n))+1
To also handle zero and negative numbers
import math
if n > 0:
digits = int(math.log10(n))+1
elif n == 0:
digits = 1
else:
digits = int(math.log10(-n))+2 # +1 if you don't count the '-'
You'd probably want to put that in a function :)
Here are some benchmarks. The len(str())
is already behind for even quite small numbers
timeit math.log10(2**8)
1000000 loops, best of 3: 746 ns per loop
timeit len(str(2**8))
1000000 loops, best of 3: 1.1 µs per loop
timeit math.log10(2**100)
1000000 loops, best of 3: 775 ns per loop
timeit len(str(2**100))
100000 loops, best of 3: 3.2 µs per loop
timeit math.log10(2**10000)
1000000 loops, best of 3: 844 ns per loop
timeit len(str(2**10000))
100 loops, best of 3: 10.3 ms per loop
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14Using log10 for this is a mathematician's solution; using len(str()) is a programmer's solution, and is clearer and simpler. Feb 3, 2010 at 7:01
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105@Glenn: I certainly hope you aren't implying this is a bad solution. The programmer's naive O(log10 n) solution works well in ad-hoc, prototyping code -- but I'd much rather see mathematicians elegant O(1) solution in production code or a public API. +1 for gnibbler.– JulietFeb 3, 2010 at 8:48
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19Hi! I go something strange, can Anyone of You please explain me why
int(math.log10(x)) +1
for99999999999999999999999999999999999999999999999999999999999999999999999
(71 nines) returns 72 ? I thought that I could rely on log10 method but I have to use len(str(x)) instead :(– MareckyMar 4, 2012 at 1:19 -
9I believe i know the reason for the strange behaviour, it is due to floating point inaccuracies eg.
math.log10(999999999999999)
is equal to14.999999999999998
soint(math.log10(999999999999999))
becomes14
. But thenmath.log10(9999999999999999)
is equal to16.0
. Maybe usinground
is a solution to this problem.– jamylakApr 6, 2012 at 1:22 -
12With some more testing: under
10**12
,len(str(n))
is the fastest. Above that, plain log10 is always the fastest, but above10**15
, it's incorrect. Only at around10**100
does my solution (~log10 with the10**b
check) begins to beat outlen(str(n))
. In conclusion, uselen(str(n))
!– gengkevJul 27, 2015 at 6:04
All math.log10 solutions will give you problems.
math.log10 is fast but gives problem when your number is greater than 999999999999997. This is because the float have too many .9s, causing the result to round up.
Therefore, to get the best performance, use math.log
for smaller numbers and only len(str())
beyond what math.log
can handle:
def getIntegerPlaces(theNumber):
if theNumber <= 999999999999997:
return int(math.log10(theNumber)) + 1
else:
return len(str(theNumber))
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1
-
2
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1"It is dangerous to rely on floating-point operations giving exact results" - Mark Dickinson, a member of core Python development team bugs.python.org/issue3724 Jun 6, 2020 at 5:18
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1
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3Jesus christ that's inefficient. how is that at 60 score? It's orders of magnitudes slower than even string conversion. For a 1040598 digit number (
2**3456789
),len(str(number))
took about 12 seconds. I forgot this in the background for minutes and it was still not done Aug 25, 2022 at 1:14
It's been several years since this question was asked, but I have compiled a benchmark of several methods to calculate the length of an integer.
def libc_size(i):
return libc.snprintf(buf, 100, c_char_p(b'%i'), i) # equivalent to `return snprintf(buf, 100, "%i", i);`
def str_size(i):
return len(str(i)) # Length of `i` as a string
def math_size(i):
return 1 + math.floor(math.log10(i)) # 1 + floor of log10 of i
def exp_size(i):
return int("{:.5e}".format(i).split("e")[1]) + 1 # e.g. `1e10` -> `10` + 1 -> 11
def mod_size(i):
return len("%i" % i) # Uses string modulo instead of str(i)
def fmt_size(i):
return len("{0}".format(i)) # Same as above but str.format
(the libc function requires some setup, which I haven't included)
size_exp
is thanks to Brian Preslopsky, size_str
is thanks to GeekTantra, and size_math
is thanks to John La Rooy
Here are the results:
Time for libc size: 1.2204 μs
Time for string size: 309.41 ns
Time for math size: 329.54 ns
Time for exp size: 1.4902 μs
Time for mod size: 249.36 ns
Time for fmt size: 336.63 ns
In order of speed (fastest first):
+ mod_size (1.000000x)
+ str_size (1.240835x)
+ math_size (1.321577x)
+ fmt_size (1.350007x)
+ libc_size (4.894290x)
+ exp_size (5.976219x)
(Disclaimer: the function is run on inputs 1 to 1,000,000)
Here are the results for sys.maxsize - 100000
to sys.maxsize
:
Time for libc size: 1.4686 μs
Time for string size: 395.76 ns
Time for math size: 485.94 ns
Time for exp size: 1.6826 μs
Time for mod size: 364.25 ns
Time for fmt size: 453.06 ns
In order of speed (fastest first):
+ mod_size (1.000000x)
+ str_size (1.086498x)
+ fmt_size (1.243817x)
+ math_size (1.334066x)
+ libc_size (4.031780x)
+ exp_size (4.619188x)
As you can see, mod_size
(len("%i" % i)
) is the fastest, slightly faster than using str(i)
and significantly faster than others.
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1You really should include the libc setup,
libc = ctyle.CDLL('libc.so.6', use_errno=True)
(guessing this is it). And it doesn't work for numbers greater thansys.maxsize
because floating point numbers can't be "very large". So any number above that, I guess you're stuck with one of the slower methods.– TorxedOct 27, 2019 at 0:39 -
Python 2.*
int
s take either 4 or 8 bytes (32 or 64 bits), depending on your Python build. sys.maxint
(2**31-1
for 32-bit ints, 2**63-1
for 64-bit ints) will tell you which of the two possibilities obtains.
In Python 3, int
s (like long
s in Python 2) can take arbitrary sizes up to the amount of available memory; sys.getsizeof
gives you a good indication for any given value, although it does also count some fixed overhead:
>>> import sys
>>> sys.getsizeof(0)
12
>>> sys.getsizeof(2**99)
28
If, as other answers suggests, you're thinking about some string representation of the integer value, then just take the len
of that representation, be it in base 10 or otherwise!
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1Sorry this answer got minus-ed. It is informative and to the plausible point of the question (if it were only more specific about which 'len' is desired). +1– mjvFeb 3, 2010 at 5:36
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3
Let the number be n
then the number of digits in n
is given by:
math.floor(math.log10(n))+1
Note that this will give correct answers for +ve integers < 10e15. Beyond that the precision limits of the return type of math.log10
kicks in and the answer may be off by 1. I would simply use len(str(n))
beyond that; this requires O(log(n))
time which is same as iterating over powers of 10.
Thanks to @SetiVolkylany for bringing my attenstion to this limitation. Its amazing how seemingly correct solutions have caveats in implementation details.
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1It does not work if n outside of range [-999999999999997, 999999999999997]– PADYMKOMar 11, 2017 at 13:16
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@SetiVolkylany, I tested it till 50 digits for python2.7 and 3.5. Just do a
assert list(range(1,51)) == [math.floor(math.log10(n))+1 for n in (10**e for e in range(50))]
.– BiGYaNMar 12, 2017 at 19:28 -
2try it with the Python2.7 or the Python3.5
>>> math.floor(math.log10(999999999999997))+1 15.0 >>> math.floor(math.log10(999999999999998))+1 16.0
. Look my answer stackoverflow.com/a/42736085/6003870.– PADYMKOMar 13, 2017 at 9:11
Well, without converting to string I would do something like:
def lenDigits(x):
"""
Assumes int(x)
"""
x = abs(x)
if x < 10:
return 1
return 1 + lenDigits(x / 10)
Minimalist recursion FTW
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2
As mentioned the dear user @Calvintwr, the function math.log10
has problem in a number outside of a range [-999999999999997, 999999999999997], where we get floating point errors. I had this problem with the JavaScript (the Google V8 and the NodeJS) and the C (the GNU GCC compiler), so a 'purely mathematically'
solution is impossible here.
Based on this gist and the answer the dear user @Calvintwr
import math
def get_count_digits(number: int):
"""Return number of digits in a number."""
if number == 0:
return 1
number = abs(number)
if number <= 999999999999997:
return math.floor(math.log10(number)) + 1
count = 0
while number:
count += 1
number //= 10
return count
I tested it on numbers with length up to 20 (inclusive) and all right. It must be enough, because the length max integer number on a 64-bit system is 19 (len(str(sys.maxsize)) == 19
).
assert get_count_digits(-99999999999999999999) == 20
assert get_count_digits(-10000000000000000000) == 20
assert get_count_digits(-9999999999999999999) == 19
assert get_count_digits(-1000000000000000000) == 19
assert get_count_digits(-999999999999999999) == 18
assert get_count_digits(-100000000000000000) == 18
assert get_count_digits(-99999999999999999) == 17
assert get_count_digits(-10000000000000000) == 17
assert get_count_digits(-9999999999999999) == 16
assert get_count_digits(-1000000000000000) == 16
assert get_count_digits(-999999999999999) == 15
assert get_count_digits(-100000000000000) == 15
assert get_count_digits(-99999999999999) == 14
assert get_count_digits(-10000000000000) == 14
assert get_count_digits(-9999999999999) == 13
assert get_count_digits(-1000000000000) == 13
assert get_count_digits(-999999999999) == 12
assert get_count_digits(-100000000000) == 12
assert get_count_digits(-99999999999) == 11
assert get_count_digits(-10000000000) == 11
assert get_count_digits(-9999999999) == 10
assert get_count_digits(-1000000000) == 10
assert get_count_digits(-999999999) == 9
assert get_count_digits(-100000000) == 9
assert get_count_digits(-99999999) == 8
assert get_count_digits(-10000000) == 8
assert get_count_digits(-9999999) == 7
assert get_count_digits(-1000000) == 7
assert get_count_digits(-999999) == 6
assert get_count_digits(-100000) == 6
assert get_count_digits(-99999) == 5
assert get_count_digits(-10000) == 5
assert get_count_digits(-9999) == 4
assert get_count_digits(-1000) == 4
assert get_count_digits(-999) == 3
assert get_count_digits(-100) == 3
assert get_count_digits(-99) == 2
assert get_count_digits(-10) == 2
assert get_count_digits(-9) == 1
assert get_count_digits(-1) == 1
assert get_count_digits(0) == 1
assert get_count_digits(1) == 1
assert get_count_digits(9) == 1
assert get_count_digits(10) == 2
assert get_count_digits(99) == 2
assert get_count_digits(100) == 3
assert get_count_digits(999) == 3
assert get_count_digits(1000) == 4
assert get_count_digits(9999) == 4
assert get_count_digits(10000) == 5
assert get_count_digits(99999) == 5
assert get_count_digits(100000) == 6
assert get_count_digits(999999) == 6
assert get_count_digits(1000000) == 7
assert get_count_digits(9999999) == 7
assert get_count_digits(10000000) == 8
assert get_count_digits(99999999) == 8
assert get_count_digits(100000000) == 9
assert get_count_digits(999999999) == 9
assert get_count_digits(1000000000) == 10
assert get_count_digits(9999999999) == 10
assert get_count_digits(10000000000) == 11
assert get_count_digits(99999999999) == 11
assert get_count_digits(100000000000) == 12
assert get_count_digits(999999999999) == 12
assert get_count_digits(1000000000000) == 13
assert get_count_digits(9999999999999) == 13
assert get_count_digits(10000000000000) == 14
assert get_count_digits(99999999999999) == 14
assert get_count_digits(100000000000000) == 15
assert get_count_digits(999999999999999) == 15
assert get_count_digits(1000000000000000) == 16
assert get_count_digits(9999999999999999) == 16
assert get_count_digits(10000000000000000) == 17
assert get_count_digits(99999999999999999) == 17
assert get_count_digits(100000000000000000) == 18
assert get_count_digits(999999999999999999) == 18
assert get_count_digits(1000000000000000000) == 19
assert get_count_digits(9999999999999999999) == 19
assert get_count_digits(10000000000000000000) == 20
assert get_count_digits(99999999999999999999) == 20
All example of codes tested with the Python 3.5
Count the number of digits w/o convert integer to a string:
x=123
x=abs(x)
i = 0
while x >= 10**i:
i +=1
# i is the number of digits
Here is a bulky but fast version :
def nbdigit ( x ):
if x >= 10000000000000000 : # 17 -
return len( str( x ))
if x < 100000000 : # 1 - 8
if x < 10000 : # 1 - 4
if x < 100 : return (x >= 10)+1
else : return (x >= 1000)+3
else: # 5 - 8
if x < 1000000 : return (x >= 100000)+5
else : return (x >= 10000000)+7
else: # 9 - 16
if x < 1000000000000 : # 9 - 12
if x < 10000000000 : return (x >= 1000000000)+9
else : return (x >= 100000000000)+11
else: # 13 - 16
if x < 100000000000000 : return (x >= 10000000000000)+13
else : return (x >= 1000000000000000)+15
Only 5 comparisons for not too big numbers.
On my computer it is about 30% faster than the math.log10
version and 5% faster than the len( str())
one.
Ok... no so attractive if you don't use it furiously.
And here is the set of numbers I used to test/measure my function:
n = [ int( (i+1)**( 17/7. )) for i in xrange( 1000000 )] + [0,10**16-1,10**16,10**16+1]
NB: it does not manage negative numbers, but the adaptation is easy...
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It is crazy how we can get so caught up on the fastest smart solution. There aren't even that many if checks, it massively improves everything, it is not ugly, yet this is not the favorite solution. If we are worrying about number accuracy we wouldn't be using python integers to begin with. It's not even that much code! We should be making things easier AND simpler. Thank you for reminding me of that Captain'Flam :D Jul 20, 2023 at 5:01
For posterity, no doubt by far the slowest solution to this problem:
def num_digits(num, number_of_calls=1):
"Returns the number of digits of an integer num."
if num == 0 or num == -1:
return 1 if number_of_calls == 1 else 0
else:
return 1 + num_digits(num/10, number_of_calls+1)
As shown by other answers, using log10
leads to incorrect results for large n
while using len(str(...))
or manual looping leads to slow performance for large n
. Jodag's answer provides a really good alternative which only fails for integers that will likely crash your computer, but we can do a bit better and even faster (for n
small enough that math.log2
is guaranteed to be accurate) by avoid logarithms altogether and using binary instead:
def num_digits(n: int) -> int:
assert n > 0
i = int(0.30102999566398114 * (n.bit_length() - 1)) + 1
return (10 ** i <= n) + i
Let's break this down. First, there's the weird n.bit_length()
. This calculates the length in binary:
assert 4 == (0b1111).bit_length()
assert 8 == (0b1011_1000).bit_length()
assert 9 == (0b1_1011_1000).bit_length()
Unlike logarithms, this is both fast and precise for integers. As it turns out, this results in exactly floor(log2(n)) + 1
. In order to get the floor(log2(n))
on its own, we subtract 1
, hence the n.bit_length() - 1
.
Next, we multiply by 0.30102999566398114
. This is equivalent to log10(2)
slightly rounded down. This takes advantage of logarithmic rules in order to calculate an estimate of floor(log10(n))
from floor(log2(n))
.
Now, you might be wondering how off we might be at this point, because although 0.30102999566398114 * log2(n) ~ log10(n)
, the same is not true for floor(0.30102999566398114 * floor(log2(n))) ~ floor(log10(n))
. Recall that x - 1 < floor(x) <= x
so that we can do some quick math:
log2(n) - 1 < floor(log2(n)) <= log2(n)
log10(n) - 0.30102999566398114 < 0.30102999566398114 * floor(log2(n)) <= log10(n)
floor(log10(n) - 0.30102999566398114) < floor(0.30102999566398114 * floor(log2(n))) <= floor(log10(n))
Note then that floor(log10(n) - 0.30102999566398114)
is at least floor(log10(n)) - 1
, meaning we are at most 1
off from our result. This is where the final correction comes in, where we check 10 ** i <= n
, which results in an extra 1 +
when the result is too small or 0 +
when the result is just right.
Similar to Jodag's answer, this approach actually fails for very very large n
, somewhere around 10 ** 2 ** 52
where i
is off by more than -1
. However, integers of that size will likely crash your computer, so this should suffice.
A fast solution that uses a self-correcting implementation of floor(log10(n))
based on "Better way to compute floor of log(n,b) for integers n and b?".
import math
def floor_log(n, b):
res = math.floor(math.log(n, b))
c = b**res
return res + (b*c <= n) - (c > n)
def num_digits(n):
return 1 if n == 0 else 1 + floor_log(abs(n), 10)
This is quite fast and will work whenever n < 10**(2**52)
(which is really really big).
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2For your linked question, you might be interested in my answer below which uses binary instead of logarithms. It is based on the same theory and generalizes to other bases as well. Oct 17, 2022 at 15:26
Assuming you are asking for the largest number you can store in an integer, the value is implementation dependent. I suggest that you don't think in that way when using python. In any case, quite a large value can be stored in a python 'integer'. Remember, Python uses duck typing!
Edit: I gave my answer before the clarification that the asker wanted the number of digits. For that, I agree with the method suggested by the accepted answer. Nothing more to add!
It can be done for integers quickly by using:
len(str(abs(1234567890)))
Which gets the length of the string of the absolute value of "1234567890"
abs
returns the number WITHOUT any negatives (only the magnitude of the number), str
casts/converts it to a string and len
returns the string length of that string.
If you want it to work for floats, you can use either of the following:
# Ignore all after decimal place
len(str(abs(0.1234567890)).split(".")[0])
# Ignore just the decimal place
len(str(abs(0.1234567890)))-1
For future reference.
-
I think it would be simpler to truncate the input number itself (e. g. with a cast to
int
) than to truncate its decimal string representation:len(str(abs(int(0.1234567890))))
returns 1. Jul 12, 2017 at 11:21 -
No, that wouldn't work. If you turn 0.17 into an integer you get 0 and the length of that would be different to the length of 0.17– FrogboxeJul 12, 2017 at 11:26
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In the first case, by truncating everything from and including the decimal point off the string representation you're effectively calculating the length of the integral part of the number, which is what my suggestion does too. For 0.17 both solutions return 1. Jul 12, 2017 at 11:32
Format in scientific notation and pluck off the exponent:
int("{:.5e}".format(1000000).split("e")[1]) + 1
I don't know about speed, but it's simple.
Please note the number of significant digits after the decimal (the "5" in the ".5e" can be an issue if it rounds up the decimal part of the scientific notation to another digit. I set it arbitrarily large, but could reflect the length of the largest number you know about.
def count_digit(number):
if number >= 10:
count = 2
else:
count = 1
while number//10 > 9:
count += 1
number = number//10
return count
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While this code may solve the question, including an explanation of how and why this solves the problem would really help to improve the quality of your post, and probably result in more up-votes. Remember that you are answering the question for readers in the future, not just the person asking now. Please edit your answer to add explanations and give an indication of what limitations and assumptions apply. Apr 21, 2020 at 16:57
def digits(n)
count = 0
if n == 0:
return 1
if n < 0:
n *= -1
while (n >= 10**count):
count += 1
n += n%10
return count
print(digits(25)) # Should print 2
print(digits(144)) # Should print 3
print(digits(1000)) # Should print 4
print(digits(0)) # Should print 1
Here is another way to compute the number of digit before the decimal of any number
from math import fabs
len(format(fabs(100),".0f"))
Out[102]: 3
len(format(fabs(1e10),".0f"))
Out[165]: 11
len(format(fabs(1235.4576),".0f"))
Out[166]: 4
I did a brief benchmark test, for 10,000 loops
num len(str(num)) ---- len(format(fabs(num),".0f")) ---- speed-up
2**1e0 2.179400e-07 sec ---- 8.577000e-07 sec ---- 0.2541
2**1e1 2.396900e-07 sec ---- 8.668800e-07 sec ---- 0.2765
2**1e2 9.587700e-07 sec ---- 1.330370e-06 sec ---- 0.7207
2**1e3 2.321700e-06 sec ---- 1.761305e-05 sec ---- 0.1318
It is slower but a simpler option.
But even this solution does give wrong results from 9999999999999998
len(format(fabs(9999999999999998),".0f"))
Out[146]: 16
len(format(fabs(9999999999999999),".0f"))
Out[145]: 17
My code for the same is as follows;i have used the log10 method:
from math import *
def digit_count(number):
if number>1 and round(log10(number))>=log10(number) and number%10!=0 :
return round(log10(number))
elif number>1 and round(log10(number))<log10(number) and number%10!=0:
return round(log10(number))+1
elif number%10==0 and number!=0:
return int(log10(number)+1)
elif number==1 or number==0:
return 1
I had to specify in case of 1 and 0 because log10(1)=0 and log10(0)=ND and hence the condition mentioned isn't satisfied. However, this code works only for whole numbers.
Top answers are saying mathlog10 faster but I got results that suggest len(str(n)) is faster.
arr = []
for i in range(5000000):
arr.append(random.randint(0,12345678901234567890))
%%timeit
for n in arr:
len(str(n))
//2.72 s ± 304 ms per loop (mean ± std. dev. of 7 runs, 1 loop each)
%%timeit
for n in arr:
int(math.log10(n))+1
//3.13 s ± 545 ms per loop (mean ± std. dev. of 7 runs, 1 loop each)
Besides, I haven't added logic to the math way to return accurate results and I can only imagine it slows it even more.
I have no idea how the previous answers proved the maths way is faster though.
n = 3566002020360505
count = 0
while(n>0):
count += 1
n = n //10
print(f"The number of digits in the number are: {count}")
output: The number of digits in the number are: 16
If you are looking for a solution without using inbuilt functions.
Only caveat is when you send a = 000
.
def number_length(a: int) -> int:
length = 0
if a == 0:
return length + 1
else:
while a > 0:
a = a // 10
length += 1
return length
if __name__ == '__main__':
print(number_length(123)
assert number_length(10) == 2
assert number_length(0) == 1
assert number_length(256) == 3
assert number_length(4444) == 4
-
The type hint
a: int
is correct, this doesn't work forfloat
. For example,number_length(1.5)
returns1
. Aug 24, 2021 at 18:47
Here is the simplest approach without need to be convert int into the string:
suppose a number of 15 digits is given eg; n=787878899999999;
n=787878899999999
n=abs(n) // we are finding absolute value because if the number is negative int to string conversion will produce wrong output
count=0 //we have taken a counter variable which will increment itself till the last digit
while(n):
n=n//10 /*Here we are removing the last digit of a number...it will remove until 0 digits will left...and we know that while(0) is False*/
count+=1 /*this counter variable simply increase its value by 1 after deleting a digit from the original number
print(count) /*when the while loop will become False because n=0, we will simply print the value of counter variable
Input :
n=787878899999999
Output:
15
If you have to ask an user to give input and then you have to count how many numbers are there then you can follow this:
count_number = input('Please enter a number\t')
print(len(count_number))
Note: Never take an int as user input.
-
A rather specific case you describe here as it is actually related to the length of a string. Also, I could enter any non-numeric character and you would still believe it is a number.– BenMay 1, 2020 at 18:01
Solution without imports and functions like str()
def numlen(num):
result = 1
divider = 10
while num % divider != num:
divider *= 10
result += 1
return result
def NoOfDigit(num):
noOfDigit = 0
while num>0: #eventually zero after continuous integer division
num = num//10 #integer Division, Eg. 123//10 will give 12
noOfDigit += 1 #this is our number of digit
return noOfDigit
Let's see a few examples:
#Example 1, it will work fine for this case
num = 12345553
print (f'Number of Digits in {num} is: {NoOfDigit(num)}')
#Example 2, negative integer number need to be made positive to this function to work
num = -1234 #in case of negative number you need to make it absoulte value
print (f'Number of Digits in {num} is: {NoOfDigit(abs(num))}')
#Example 3, zero before integer is not understood by the function so it needs to be taken care before we feed into the function
num = 012345553 #this will not be a valid integer for this code
print (f'Number of Digits in {num} is: {NoOfDigit(num)}')