1 2 3 4 5
A | | | | | |
B | | | | | |
C | | | | | |
D | | | | | |
E | | | | | |

1. The sum of each column is odd
   
2. The sum of each row, except C, is even
   
3. The sum of row A is not greater than the sum of any other row
   
4. The sum of the diagonal E1 to A5 is less than that of the diagonal A1 to E5
   
5. A4 + B4 > C4 + D4 + E4
   
6. A1 + B1 = D1 + E1
   
7. A1 > E1
   
8. A1, A3 and B1 are all prime numbers
   
9. (A3 + E3) is a prime number
   
10. A5, D1, D3 and E1 are all squares
    
11. B2, C2 and D2 are ascending consecutive numbers
    
12. B3, C3 and D3 are ascending consecutive numbers
    
13. B5 + D5 = A5 + C5
    
14. (C1)² + (C5)² = (E3)²
    
15. C5 is a two digit number
    
16. D5 is a multiple of E5
    
17. E1 + E3 = E2 + E4 + E5

not sure if i'm suppose to show my work but...

since most of the hints narrow down the possible numbers belonging in certain squares, i tried to find all the different possibilities and cross reference them with the possibilities of connected hints.  for example... 

a set of 3 consecutive numbers whose final member is a square can only be {2,3,4},{7,8,9},{14,15,16}, and {23,24,25} - hints 10 and 12)  

if A3 (which must be an odd number because if A1 + B1 = D1 + E1, and the sum of each column is an odd number, then C1 must be an odd number) + C5  (which is a 2 digit number) = E3 (which, logically, must also be a 2 digit number, and when added to a prime number the sum is another prime number) then you're left with 4 possibilities, which can be reduced to one if you bear in mind that there are only five squares and four of these have assigned positions. - hints 1,6, 8, 9, 10, 14, 15.

etc. 

that all sounds really confusing, and it is.  i'm sure there was an easy way to go about this, but that's how i did it.