B. Fill in the blanks with correct terms in order to make the postulates and theorem correct. Postulate 1.1 Postulate 1.2 Postulate 1.4 Postulate 1.9 Theorem 1 (Euclid, I. 4.) Through two points, there is exactly one (1). Two lines can intersect in exactly (2). point. Through any three points that are not on the same line, there is exactly one (3) If two shapes are congruent, then their areas are (4), If two triangles have two sides equal to two sides respectively, and if the angles contained by those sides are also equal, then the triangles will be (5) in all respects. The straight line that bisects the vertex angle of an isosceles triangle is the (6). bisector of the base. Theorem 2 Theorem 4 (Euclid, I, 6.) If two angles of a triangle are equal, then the sides that subtend those angles will be (7) Theorem 5 (Euclid, I. 13.) When a straight line that stands on another straight line makes angles, either it makes two (8) angles, or it makes angles that together are equal to two right angles. Theorem 8 (Euclid, I. 29.) When a straight line crosses two parallel straight lines it makes the alternate angles (9) and it makes the exterior angle (10) to the opposite interior angle on the same side.​