SOLUTION Strong induction Studypool
Discrete Math Strong Induction. This is where it is imperative that we use strong. Web bob was beginning to understand proofs by induction, so he tried to prove that \(f(n)=2n+1\) for all \(n \geq 1\).
Web since $s(r)$ is assumed to be true, $r$ is a product of primes [note: Web bob was beginning to understand proofs by induction, so he tried to prove that \(f(n)=2n+1\) for all \(n \geq 1\). This is where it is imperative that we use strong.
This is where it is imperative that we use strong. This is where it is imperative that we use strong. Web since $s(r)$ is assumed to be true, $r$ is a product of primes [note: Web bob was beginning to understand proofs by induction, so he tried to prove that \(f(n)=2n+1\) for all \(n \geq 1\).
