Use predicates (1) through (10) to answer the following questions.

1. p = a (b c)

2. p = a (b c)

3. p = a b

4. p = a (b c)

5. p = a b

6. p = a (b c)

7. p = (a b) (c d)

8. p = (a b) (a c) (a c)

9. p = a b (c d) 10. p = (a b) (b c) (a c)

(a) Identify the clauses that go with predicate p.

(b) Compute (and simplify) the conditions under which each of the clauses determines predicate p.

(c) Write the complete truth table for all clauses. Label your rows starting from 1. Use the format in the example underneath the definition of combinatorial coverage in Section 3.2. That is, row 1 should be all clauses true. You should include columns for the conditions under which each clause determines the predicate, and also a column for the predicate itself.

(d) Identify all pairs of rows from your table that satisfy general active clause coverage (GACC) with respect to each clause.

(e) Identify all pairs of rows from your table that satisfy correlated active clause coverage (CACC) with respect to each clause.

(f) Identify all pairs of rows from your table that satisfy restricted active clause coverage (RACC) with respect to each clause.

(g) Identify all 4-tuples of rows from your table that satisfy general inactive clause coverage (GICC) with respect to each clause. Identify any infeasible GICC test requirements.

(h) Identify all 4-tuples of rows from your table that satisfy restricted inactive clause coverage (RICC) with respect to each clause. Identify any infeasible RICC test requirements.