Modus Tollendo Ponens/Proof Rule

Proof Rule
The Modus Tollendo Ponens is a valid deduction sequent in propositional logic.

As a proof rule it is expressed in either of the two forms:
 * $(1): \quad$ If we can conclude $\phi \lor \psi$, and we can also conclude $\neg \phi$, then we may infer $\psi$.
 * $(2): \quad$ If we can conclude $\phi \lor \psi$, and we can also conclude $\neg \psi$, then we may infer $\phi$.

It can be written:
 * $\displaystyle {\left({\phi \lor \psi}\right) \quad \neg \phi \over \psi} \textrm{MTP}_1 \qquad \text{or} \qquad {\left({\phi \lor \psi}\right) \quad \neg \psi \over \phi} \textrm{MTP}_2$