Answer:
Explanation:
Expanding the expression, we get:
pq(p+q-pq) = pq(p+q) - pq^2
Simplifying further, we can factor out a pq from the first term:
pq(p+q) - pq^2 = pq[(p+q) - q]
Using the distributive property, we can simplify the expression inside the brackets:
pq[(p+q) - q] = pq(p)
Therefore, pq(p+q-pq) simplifies to pq(p), which can also be written as p^2q.