1. **State the problem:** Determine which sets of points among the given options are collinear, meaning they lie on the same straight line. 2. **Given information:** Points B, Q, and P lie on a straight line inside the parallelogram. 3. **Recall the definition:** Points are collinear if they lie on the same straight line. 4. **Analyze each option:** - Points B, Q, and P: Given as collinear. - Points A, B, and P: Since B and P are on the line with Q, check if A lies on that line. No indication that A lies on the line with B and P. - Points A, M, and P: No information suggests these three are collinear. - Points M, B, and Q: Since B and Q are on the line with P, check if M lies on that line. No indication that M lies on the line with B and Q. 5. **Conclusion:** Only points B, Q, and P are collinear. **Final answer:** Points B, Q, and P are collinear.