The following diagram shows that 10 \(\not \Rightarrow\) 255 is a code 6 non-implication, and the theory of transferability then shows that it is actually a code 4. It follows that the non-implication 389 \( \not \Rightarrow \) 255 is not just a code 6 non-implication, but is also a code 4 non-implication.
| 255 | This form is negation transferable | |||
| \(\Downarrow\) | ||||
| 260 | ||||
| \(\Downarrow\) | ||||
| 40 | ||||
| \(\Downarrow\) | ||||
| 39 | ||||
| \(\Downarrow\) | ||||
| 8 | ||||
| \(\Downarrow\) | ||||
| 9 | ||||
| \(\Downarrow\) | ||||
| 17 | ||||
| \(\Downarrow\) | ||||
| 133 | \( \not \Rightarrow \) | 124 | ||
| \( \Downarrow \) | ||||
| This form is transferable | 10 | |||
| \( \Downarrow \) | ||||
| 80 | ||||
| \( \Downarrow \) | ||||
| 389 |