In triangle OAB, E is the mid point of AB and F is a point on OA such that OF = 2FA. If C is the point of intersection of OE and BF, then find the ratio OC:CE and BC : CF are
1. 1:4; 3:2
2. 4:1 : 3:2
3. 4:1; 1:2
4, 4:1; 2:3

ABCD is a parallelogram and P is a point on the segment AD dividing it internally in the ratio 3:1 the line BP meets the diagonal AC in Q, Then the ratio AQ:QC is
1. 3:4
2. 4:3
3. 3:2
4. 2:3