# row-major 3-D array address

i have this 3-D array declaration: `A[10..29][2..6][-1..0].`

Assuming this row-major array is stored starting at base address 100, where is element A[25][4][-1] stored? my answer is 416

next question is : Using the same assumptions, what element is stored at address 2000?

How can i solve such a question?

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What kind of declaration is this? `10..29, 2..6, -1..0`? Am I missing something? – Pavan Manjunath Mar 24 '12 at 9:17
This is the full question: Consider the following 3-D array declaration: A[10..29][2..6][-1..0]. #List the first 10 elements of the array assuming it is stored in row-major order. #Do the same for column-major #Assuming each array element is size 20, what is the size of the overall array? You don’t have to give the answer if you give me the correct equation. #Assuming this row-major array is stored starting at base address 100, where is element A[25][4][-1] stored? #Using the same assumptions, what element is stored at address 2000? – nullException Mar 24 '12 at 20:23

## 1 Answer

I think this might help. I have put it in a code block so that it lines up well.

``````/*
*  Assuming that the array is laid out row/column/other then...
*      Row-major           Column-major
*      A[10][2][-1]        A[10][2][-1]
*      A[10][2][0]         A[10][2][0]
*      A[10][3][-1]        A[11][2][-1]
*      A[10][3][0]         A[11][2][0]
*      A[10][4][-1]        A[12][2][-1]
*      A[10][4][0]         A[12][2][0]
*      A[10][5][-1]        A[13][2][-1]
*      A[10][5][0]         A[13][2][0]
*      A[10][6][-1]        A[14][2][-1]
*      A[10][6][0]         A[14][2][0]
*
*  Since the array is 20 rows (29 - 10 + 1) by 5 columns (6 - 2 + 1) by
*  2 other (0 - (-1) + 1), with each elelment given as size 20, the
*  overall array size is 20 * 5 * 2 * 20 = 4000.
*
*  The address of element A[25][4][-1], given the array is row-major
*  begining at 100 is...
*  Base address                                                          100
*  Offset index0 = (25 - 10) * ((6 - 2 + 1) * (0 - (-1) + 1)) * 20 =   3,000
*  Offset index1 =                 (4 - 2) * ((0 - (-1) + 1)) * 20 =      80
*  Offset index2 =                                (-1 - (-1)) * 20 =       0
*  Offset for A[25][4][-1]                                         =   3,180
*
*  Now that you have the idea, I will leave it to you to determine what element
*  is at address 2000.  Here is a hint, repeat the above but using substraction.
*/
``````
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