Module 5 Higher June 2005 Paper 1

1. Module 5 Higher June 2005 Paper 1

2. 1. Which is larger 5/6 or ¾?You must show your working.You may use the grids to help you. Or, think of 5/6 as 10/12, and think of 3/4 as 9/12. Then compare these instead You could shade 5/6 of one grid (10 squares) and ¾ of the other (9 squares). This shows easily which is bigger. (2 marks)

3. 2 Find, using trial and improvement, an exact solution of3x2 – 2x = 96 It’s a non-calc paper, so the answer must be “nice”!! (3 marks)

4. 2 Find, using trial and improvement, an exact solution of3x2 – 2x = 96 (3 marks)

5. 2 Find, using trial and improvement, an exact solution of3x2 – 2x = 96 (3 marks)

6. 2 Find, using trial and improvement, an exact solution of3x2 – 2x = 96 So x = 6 (3 marks)

7. 3 (a) A, B and C are three towns which form an equilateral triangle as shown. Bearings are just angles measured from north, going clockwise • Use the bearings given to complete the sentences. • 060o 120o 180o 240o 300o • C is on a bearing of from A. • B is on a bearing of from C 120° (1 mark) 240° (1 mark)

8. D, E, F are three towns.E and F are shown on the diagram.D is on a bearing of 070o from E.D is also on a bearing of 320o from F.Complete the diagram to show accurately the position of D Protractor cross on the town, 0° pointing north!! Draw the two lines faintly, then mark the cross. D ( 2 marks)

9. 4. The diagram shows a parallelogram ABCD.Angle BAC = 20oAngle ADC = 70o • Show that angle x is a right angle. • The area of the triangle ADC is 8.4cm2 • Work out the area of the parallelogram. (2 marks) (2 marks)

10. If D is 70°, then so is B. In the triangle ABC, 20° + 70° = 90°. So 90° is left at C. (2) The two triangles are congruent (exactly the same), so the area is 2 x 8.4 = 16.8 cm2. (2)

11. 5 (a) Factorise 10p – 4 (b) Factorise q2 + 3q (c) Factorise r2 – r (d) Simplify t2 x t3 “factorise” – see what’s in both bits In the first one, 2 is. = 2(5p – 2) (1 mark) = q(q + 3) (1 mark) With multiplying powers, ADD = r(r - 1) (1 mark) = t5 (1 mark)

12. 6 (a) Complete the table of values for y = x3 – 4 -12 -3 4 (2 marks) Do some jotting if it will help you get it right!! e.g. 23-4 = 8-4 = 4

13. (b) On the grid, draw the graph of y = x3 – 4 for values of x from -2 to 2.

14. 7 (a) Solve the inequality 3x + 5 ≤ 16 (2 marks)(b) Write down the integer value satisfied by the inequality 5 < 2x < 7 (2 marks) 3x + 5 ≤ 16 3x ≤ 11 x ≤ Treat it like an equation! 2x must be 6, so x = 3 “Integer” = whole number

15. 8a Factorise r6 – 3r4 r4 goes into both parts, so use that as the outside the bracket term. r6 – 3r4 = r4(r2 – 3)

16. 8b (i) Factorise x2+ 5x – 14 Need two numbers that x to make -14 and + to make 5. The numbers are 7 and -2. So, (x + 7)(x – 2) (2) (ii) Hence solve the equation x2 + 5x – 14 = 0 (x + 7)(x – 2) = 0 means: Either (x + 7) = 0 or (x – 2) = 0 So, either x = -7 or x = 2 (1)

17. 9 Two congruent triangles are shown.Angle B = Angle E “congruent” = exactly the same size and shape. Always draw them the same way round first. (a) Write down the length of DF. Not the 5.6 side, not the longest side, so must be the 9.4cm side. (1 mark) (b) Explain why angle A = angle D e.g. The triangles are congruent, so the smallest angles must be equal. (1 mark)

18. 10 (a) Write down the equation of a line that is parallel to the line y = 5x (1mark) (b) Work out the gradient of the line y + 2x = 6 (2 marks) If it’s parallel, then the gradient is the same. So, “y = 5x + anything” would work. e.g. y = 5x + 1, y = 5x – 7, etc etc Change the equation round so that it looks like “y = ▒x + ▓”. Then the number with the x is the gradient. y + 2x = 6 y = -2x + 6, so the gradient is -2

19. 11 The diagram shows a cylinder.The diameter of the cylinder is 10cm.The height of the cylinder is 10cm. • Work out the volume of the cylinder. • Give your answer in terms of π. Base area x height works for any prism Use V = πr2 x h = π x 52 x 10 = 250 π cm3. π250 loses a mark – always put the number first! (3 marks)

20. Twenty of the cylinders are packed in a box of height 10cm.The diagram shows how the cylinders are arranged inside the box.The shaded area is the space between the cylinders. Work out the volume inside of the box that is not filled by the cylinders. Give your answer in terms of π. (4 marks)

21. The box must be 50 by 40 cm, and 10 cm high. Volume of the box is 50 x 40 x 10 = 20 000 cm3. There are 20 cylinders inside, each with a volume of 250π. Volume of cylinders is 5000π cm3. Volume of empty space is 20 000 - 5000π cm3. (4 marks)

22. 12a) In the diagram, O is the centre of a circle. Remember, “write down” is different from “work out” Write down the value of a. (1) a is 45° (because angle at the middle is double the angle at the edge)

23. 12b) Write down the value of b. (1) b = 53° (angles made from the same points are equal).

24. 12c) In the diagram, O is the centre of a circle. Write down the value of c. (1) c = 90° (because the angle in a semicircle is always 90°)

25. 12d) Write down the value of d. (1) d = 80° (because in a “cyclic quadrilateral”, opposite angles add up to 180°)

26. 13 Shape B is an enlargement of shape A • Write down the centre of enlargement • Write down the scale factor of the enlargement (-1,0) (1) sf = -0.5 (1) (not -2!!)

27. 14 In triangle ABC, M is the midpoint of BC. and a) Find in terms of s and t. Why?? (3) or

28. b) • AB is not equal to AC. • Write down the name of the shape ABDC. • Write down one fact about the points A M and D Parallelogram Either AMD are all on the same straight line, because and so they’re parallel and from the same point Or M is halfway between A and D, because and

29. 15 When y = 2x + 3 and y = -2x -1 are drawn on a grid, there are two lines of symmetry. Find their equations. The equations are x = -1 and y = 1

30. 16a Find the values of a and b so that x2 + 10x + 40 = (x + a)2 + b Do ½ of the x term, and multiply out (x + 5)2 = x2 + 5x + 5x + 25 (x + 5)2 = x2 +10x + 25 So, x2 + 10x + 40 = (x + 5)2 + 15 a = 5, b = 15 16b Hence write the minimum value of x2 + 10x + 25. Minimum value is 15(which happens when (x + 5)2 = 0)

31. 17 The diagram shows the graph of y = cos x° for 0° ≤ x ≤ 360° For each equation, write down the number of solutions in the range 0° ≤ x ≤ 360° a) cos x = -0.5 2 solutions

32. For each equation, write down the number of solutions in the range 0° ≤ x ≤ 360° b) 2cos x = -0.5 2 solutions

33. For each equation, write down the number of solutions in the range 0° ≤ x ≤ 360° c) ½ cos x = -0.5 1 solution

34. For each equation, write down the number of solutions in the range 0° ≤ x ≤ 360° d) cos 2x = -0.5 4 solutions

35. 18 Prove that “Prove” means start from the question, and manipulate until you end up with the “answer”! as required

36. 19 The graph shows four curves A B C and D. Match each curve to its equation. A D C B