A proof is a clear explanation, accepted by the mathematical community, of why something is true

The following result shows how this can be done.

1. 
   P(n₀) is true and
   
2. 
   If P(K) is true for some K  n₀, then P(K + 1) must also be true. The P(n) is true for all n  n₀.
   

Then we must prove that P(K)  P(K + 1) is a tautology for any choice of K  n₀. Since, the only case where an implication is false is if the antecedent

is true and the consequent is false; this step is usually done by showing that if P(K) were true, then P(K + 1) would also have to be true. This step is called induction step.

In short we solve by following steps.

1. 
   Show that P(1) is true.
   
2. 
   Assume P(k) is true.
   
3. 
   Prove that P(k +1) is true using P(k) Hence P(n) is true for every n.