Page 21. Kindly write the answer and solution on a sheet of paper or anything that can easily read and understand. Thankyou!

0917-126-91 8. In which type of balance are the shapes and patterns identical on either side of a central boundary? A, Asymmetry C. Radial B. Symmetry D. Perspective 9. Which involves taking a preimage and transforming it in some way to produce an image? A. Transformation C. Balance B. Proportion D. Perspective 10. Which is a collection of shapes, repeating or altered to create a cohesive design A. Transformation C. Geometric patterns B. Perspective D. Balance II. Identification. Tell what level in the Van Heile Theory is illustrated in the following. Write only the level number on the space provide before each number. 0 - Visualization 1 - Analysis 2 - Abstract 3 - Deduction 4 - Rigor 1. Which of these can be called rectangles? A. Q only B. Q and R only C. P/and Q only D. P, Q and R P R 2. Here are the properties of a figure. Property D: It has diagonals of equal length. Property S: It is a square. Property R: It is a rectangular Which is true? A. D implies S which implies R B. D implies R which implies S C. /S implies R which implies D D. R implies D which implies S 3. Here are two statements: Statement 1: Figure F is a rectangle. Statement 2: Figure F is a triangle. Which is correct? A. If 1 is true, then 2 is true. (c. 1 and 2 cannot both be true B. If 1 is false, then 2 is true D. 1 and 2 cannot both be false. 4. Here is a right triangle ABC. Equilateral triangles ACE, ABF and BCD have been constructed on the sides of ABC. From the figure, one can prove that line segment AD, BE and CF have a point in common. What would this proof tell you? A. Only in this triangle drawn can we be sure that AD, BE and CF have a point in common. B. In some but not all triangles, AD, BE, and CF have a point in common. C. In any right triangle, AD, BE, and CF have a point in common. D. In any triangle, AD, BE, and CF have appoint in common