Why does the indexing in an array start with zero in C and not with 1?

  • 5
    It's all about Pointers! – medopal Sep 6 '11 at 13:33
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    possible duplicate of Defend zero-based arrays – dmckee Sep 6 '11 at 18:28
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    A pointer (array) is a memory direction and index is an offset of that memory direction, so the first element of the pointer (array) is the one who offset is equal to 0. – D33pN16h7 Sep 7 '11 at 2:47
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    Why should it start with 1? – Gunther Piez Feb 18 '12 at 12:22
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    @drhirsch because when we count a set of objects, we begin by pointing at an object and saying "one". – phoog Feb 21 '12 at 15:53

13 Answers 13


In C, the name of an array is essentially a pointer, a reference to a memory location, and so the expression array[n] refers to a memory location n-elements away from the starting element. This means that the index is used as an offset. The first element of the array is exactly contained in the memory location that array refers (0 elements away), so it should be denoted as array[0].

for more info:


  • 16
    The name of an array is the name of the array; contrary to the common misconception, arrays are not pointers in any sense. An array expression (such as the name of an array object) is usually, but not always, converted to a pointer to the first element. Example: sizeof arr yields the size of the array object, not the size of a pointer. – Keith Thompson Sep 21 '11 at 7:44

This question was posted over a year ago, but here goes...

About the above reasons

While Dijkstra's article (previously referenced in a now-deleted answer) makes sense from a mathematical perspective, it isn't as relevant when it comes to programming.

The decision taken by the language specification & compiler-designers is based on the decision made by computer system-designers to start count at 0.

The probable reason

Quoting from a Plea for Peace by Danny Cohen.

For any base b, the first b^N non-negative integers are represented by exactly N digits (including leading zeros) only if numbering starts at 0.

This can be tested quite easily. In base-2, take 2^3 = 8 The 8th number is:

  • 8 (binary: 1000) if we start count at 1
  • 7 (binary: 111) if we start count at 0

111 can be represented using 3 bits, while 1000 will require an extra bit (4 bits).

Why is this relevant

Computer memory addresses have 2^N cells addressed by N bits. Now if we start counting at 1, 2^N cells would need N+1 address lines. The extra-bit is needed to access exactly 1 address. (1000 in the above case.). Another way to solve it would be to leave the last address inaccessible, and use N address lines.

Both are sub-optimal solutions, compared to starting count at 0, which would keep all addresses accessible, using exactly N address lines!


The decision to start count at 0, has since permeated all digital systems, including the software running on them, because it makes it simpler for the code to translate to what the underlying system can interpret. If it weren't so, there would be one unnecessary translation operation between the machine and programmer, for every array access. It makes compilation easier.

Quoting from the paper:

enter image description here

  • 3
    +1 sound like an answer to me – Tom Sarduy Nov 22 '12 at 20:47
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    What if they had just removed the bit 0.. then the 8th number would still be 111... – DanMatlin Aug 17 '13 at 20:38
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    Are you actually suggesting modification of basic arithmetic to make it fit in? Don't you think what we have today is a far better solution? – Anirudh Ramanathan Aug 17 '13 at 20:39
  • +1 Nice answer. – Jayesh Bhoi Sep 12 '14 at 9:10
  • Years later my 2 cnt worth. In my experience (~35 years of programming) the modulo or modular addition operation in one form or other comes up surprisingly often . With zero base the next in sequence is (i+1)%n but with base 1 it comes (i-1)%n)+1, so I think 0 based is preferred. This crops up in math and programming quite often. Maybe it is just me or the field in which I work. – nyholku Apr 12 '18 at 13:50

Because 0 is how far from the pointer to the head of the array to the array's first element.


int foo[5] = {1,2,3,4,5};

To access 0 we do:


But foo decomposes to a pointer, and the above access has analogous pointer arithmetic way of accessing it

*(foo + 0)

These days pointer arithmetic isn't used as frequently. Way back when though, it was a convenient way to take an address and move X "ints" away from that starting point. Of course if you wanted to just stay where you are, you just add 0!


Because 0-based index allows...


...to be implemented as...

*(array + index)

If index were 1-based, compiler would need to generate: *(array + index - 1), and this "-1" would hurt the performance.

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    You bring up an interesting point. It can hurt performance. But will the performance hit be significant to justify use of 0 as starting index ? I doubt it. – FirstName LastName Jan 20 '13 at 2:26
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    @FirstNameLastName 1-based indexes offer no advantage over 0-based indexes yet they perform (slightly) worse. That justifies 0-based indexes no matter how "small" the gain is. Even if 1-based indexes offered some advantage, it's in the spirit of C++ to choose performance over convenience. C++ is sometimes used in contexts where every last bit of performance matters, and these "small" things can quickly add up. – Branko Dimitrijevic Jan 20 '13 at 20:11
  • Yes, i understand that small things can add up and sometimes become a big thing. For example, $1 per year is not much money. But, if 2 billion people donate it, then we can do a lot of good for humanity. I am looking for a similar example in coding which could cause poor performance. – FirstName LastName Jan 21 '13 at 9:17
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    Rather than subtracting 1, you should use the address of the array-1 as the base address. That what we did in a compiler I once worked on. That eliminates the runtime subtraction. When you're writing a compiler, those extra instructions matter a lot. The compiler will be used to generate thousands of programs, each of which may be used thousands of times, and that extra 1 instruction may occur in several lines inside an n squared loop. It can add up to billions of wasted cycles. – progrmr Mar 10 '13 at 18:19
  • No it wont hurt the performance once it is compiled, it will only add a small build time because in the end it will be translated to machine code.It will only hurt the compiler designers. – Hassaan Akbar Jul 1 '18 at 23:47

Because it made the compiler and linker simpler (easier to write).


"...Referencing memory by an address and an offset is represented directly in hardware on virtually all computer architectures, so this design detail in C makes compilation easier"


"...this makes for a simpler implementation..."

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    +1 Not sure why the down votes. While it doesn't directly answer the question, 0-based indexing is not natural for people or mathematicians - the only reason it's done is because the implementation is logically consistent (simple). – phkahler Sep 6 '11 at 17:58
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    @phkahler: the error is in authors and languages calling array indices as indices; if you think of it as an offset, then 0-based becomes natural for lay person as well. Consider the clock, the first minute is written as 00:00, not 00:01 isn't it? – Lie Ryan Sep 6 '11 at 19:24
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    +1 -- this is probably the most correct answer. C predate Djikistras paper and was one of the earliest "start at 0" languages. C started life "as a high level assembler" and its likely that K & R wanted to stick as closely to the way it was done in assembler where you would normaly have a base address plus an offset starting at zero. – James Anderson Sep 7 '11 at 8:40
  • I thought the question was why 0 based was used, not which is better. – progrmr Sep 7 '11 at 12:43
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    I won't downvote but as progrmr commented above the base can be taken care of by adjusting the arrays address so regardless of base execution time is same and this is trivial to implement in the compiler or interpreter so it does not really make for simpler implementation. Witness Pascal where you can use any range for indexing IIRC, it has been 25 years ;) – nyholku Apr 12 '18 at 13:54

Array index always starts with zero.Let assume base address is 2000. Now arr[i] = *(arr+i). Now if i= 0, this means *(2000+0)is equal to base address or address of first element in array. this index is treated as offset, so bydeafault index starts from zero.


For the same reason that, when it's Wednesday and somebody asks you how many days til Wednesday, you say 0 rather than 1, and that when it's Wednesday and somebody asks you how many days until Thursday, you say 1 rather than 2.

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    Your answer seems just a matter of opinion. – heltonbiker Sep 7 '11 at 2:19
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    Well, it's what makes adding indices/offsets work. For example if "today" is 0 and "tomorrow" is 1, "tomorrow's tomorrow" is 1+1=2. But if "today" is 1 and "tomorrow" is 2, "tomorrow's tomorrow" is not 2+2. In arrays, this phenomenon happens whenever you want to consider a subrange of an array as an array in its own right. – R.. Sep 7 '11 at 2:37
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    Calling a collection of 3 things "3 things" and numbering them 1,2,3 is not a deficiency. Numbering them with an offset from the first one is not natural even in mathematics. The only time you index from zero in math is when you want to include something like the zero-th power (constant term) in a polynomial. – phkahler Sep 8 '11 at 17:57
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    Re: "Numbering arrays starting with 1 rather than 0 is for people with a severe deficiency of mathematical thinking." My edition of CLR's "Introduction to Algorithms" uses 1-based array indexing; I don't think the authors have a deficiency in mathematical thinking. – RexE Sep 16 '11 at 3:11
  • No, I would say the seventh one is at index 6, or 6 positions away from the first one. – R.. Apr 3 '14 at 22:58

The most elegant explanation I've read for zero-based numbering is an observation that values aren't stored at the marked places on the number line, but rather in the spaces between them. The first item is stored between zero and one, the next between one and two, etc. The Nth item is stored between N-1 and N. A range of items may be described using the numbers on either side. Individual items are by convention described using the numbers below it. If one is given a range (X,Y), identifying individual numbers using the number below means that one can identify the first item without using any arithmetic (it's item X) but one must subtract one from Y to identify the last item (Y-1). Identifying items using the number above would make it easier to identify the last item in a range (it would be item Y), but harder to identify the first (X+1).

Although it wouldn't be horrible to identify items based upon the number above them, defining the first item in the range (X,Y) as being the one above X generally works out more nicely than defining it as the one below (X+1).


The technical reason might derive from the fact that the pointer to a memory location of an array is the contents of the first element of the array. If you declare the pointer with an index of one, programs would normally add that value of one to the pointer to access the content which is not what you want, of course.


Try to access a pixel screen using X,Y coordinates on a 1-based matrix. The formula is utterly complex. Why is complex? Because you end up converting the X,Y coords into one number, the offset. Why you need to convert X,Y to an offset? Because that's how memory is organized inside computers, as a continuous stream of memory cells (arrays). How computers deals with array cells? Using offsets (displacements from the first cell, a zero-based indexing model).

So at some point in the code you need (or the compiler needs) to convert the 1-base formula to a 0-based formula because that's how computers deal with memory.


Suppose we want to create an array of size 5
int array[5] = [2,3,5,9,8]

let the 1st element of the array is pointed at location 100

and let we consider the indexing starts from 1 not from 0.

now we have to find the location of the 1st element with the help of index
(remember the location of 1st element is 100)

since the size of an integer is 4-bit
therefore --> considering index 1 the position would be
size of index(1) * size of integer(4) = 4
so the actual position it will show us is

100 + 4 = 104

which is not true because the initial location was at 100.
it should be pointing to 100 not at 104
this is wrong

now suppose we have taken the indexing from 0
position of 1st element should be
size of index(0) * size of integer(4) = 0

therefore -->
location of 1st element is 100 + 0 = 100

and that was the actual location of the element
this is why indexing starts at 0;

I hope it will clear your point.


Array name is a constant pointer pointing to the base address.When you use arr[i] the compiler manipulates it as *(arr+i).Since int range is -128 to 127,the compiler thinks that -128 to -1 are negative numbers and 0 to 128 are positive numbers.So array index always starts with zero.

  • What do you mean by 'int range is -128 to 127'? An int type is required to support at least a 16-bit range, and on most systems these days supports 32-bits. I think your logic is flawed, and your answer really doesn't improve on the other answers already provided by other people. I suggest deleting this. – Jonathan Leffler Aug 5 '15 at 0:55

becoz when we access the array elements following formula is used by compiler ((base address)+index*size) fisrt element always get stored at base address in arrays... So if we start with 1 we cant accesss first element as it gives address of sesond element... so it starts with 0.

  • 1
    I don't think this answer is providing any valuable insights. – Jonathan Leffler Aug 5 '15 at 1:11

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