# Hill cipher implementation when results are not expected

I am working on some ciphers (just theory, no coding yet). Currently I am doing the hill cipher and I can use it fine. However I have came across a problem which has stumped me. Say for example I am encrypting the letters A and I. `A` would be `0` and `I` `8`. Now take my encryption box to be:

`````` K= 18 2
23 0
``````

This is all well and good. I can encrypt as such:

A = 18*0 = 0 2 *8 = 16

The problem is that adding these results produces 16. Is 16 % 26 just 16? Is this the number that I use for my encryption? Similar problem occurs if I have an encryption where the result is 260 % 26. Do this become 10 or 0? When you divide 260 by 26 you get 10. To finish the modulo operation I would take away any whole number and multiply the remainder by 26. Of course if I do it in this case then I get 0, which cannot be multiplied. Any suggestions?

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Yes. `16 % 26 = 16` and `260 % 26 = 0.`
The point is that your encryption matrix cannot be used as Hill cipher's encryption/decryption key. The reason is that the encryption matrix must have an `inverse matrix` (modulo `26`). In other words, the `determinant` of the matrix must be `nonzero`, and not divided by `2` or `13`. In fact, the `determinant` of your matrix is `24 mod 26`, which cannot satisfy this requirement of the Hill cipher. This is why you got the strange result and the decryption will failed.
`3 5`
`1 2` can be used as an encryption matrix.