Write down in words \(\neg p\).

Write down in symbolic form the compound statement

\(r:\) If \(x\) is a multiple of \(12\), then \(x\) is a multiple of \(6\).

Consider the compound statement

\(s:\) If \(x\) is a multiple of \(6\), then \(x\) is a multiple of \(12\).

Identify whether \(s:\) is the inverse, the converse or the contrapositive of \(r\).

Consider the compound statement

\(s:\) If \(x\) is a multiple of \(6\), then \(x\) is a multiple of \(12\).

Determine the validity of \(s\). Justify your decision.

\(x\) is not a multiple of \(12\)     (A1)     (C1)

\(p \Rightarrow q\)     (A1)(A1)(C2)

Note: Award (A1) for \( \Rightarrow \), (A1) for \(p\) and \(q\) in the correct order.

Accept \(q \Leftarrow p\).

Converse     (A1) (C1)

not valid     (A1)

for example \(18\) is a multiple of \(6\) and not a multiple of \(12\)     (R1)     (C2)

Notes: Do not award (A1)(R0). Any multiple of 6 that is not a multiple of \(12\) can be accepted as a counterexample.