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Algebra ‘C/D’ Borderline Revision Document Algebra content that could be on Exam Paper 1 or Exam Paper 2 but: If you need to use a calculator for *** shown (Q8 and Q9) then do so. Questions are numbered and presented in exam style format MUST BE ABLE TO DO SHOULD TRY FANCY A CHALLENGE! Topic: I can…… Acid test factorise, expand and simplify expressions (grade C/D) 1a) factorise a single bracket b) Use the rules of indices with a bracket c) Use the rules of indices with a fraction 2a) expand two single brackets and then simplify b) Use rules of indices with harder expressions expand the product of two brackets (grade C) factorise a complex quadratic (grade B) use algebra within a proof (grade A) solve a quadratic inequality (grade A) spot errors in solving equations (grade B/C) form equations and make substitutions into formulae (grade B/C) *** 3. Expand two brackets and then simplify recognise when to and know how to calculate the equation of a straight line. (grade B/C) change the subject of a simple formula (grade C) solve simultaneous equations and inequalities (grade A/B) form algebraic rules and use them for arithmetic and diagram sequences (grade B/C) 4. Take out a common factor then factorise the remaining quadratic using the difference of two squares 5. Use expanding and factorising techniques to form an algebraic proof for an identity. 6. Solve a quadratic inequality by factorisation method, modelled on quadratic equations. 7a) Spot an error in a solution for a linear equation b) spot an error in a solution for a quadratic equation 8. Form and solve a linear equation in order to find an area. 9.a) Use substitution to find values in a linear formula b) Use a quadratic formula and form an inequality 10 and 11. Form equations of a line using the properties of perpendicular gradients. 12 Recognise parallel lines from their equations 13 Use the method applied to equations to change the subject in a linear formula with three unknowns. 14 and 15a Solve simultaneous linear equations to find x and y 15b Solve a pair of simultaneous linear inequations 16 Solve simultaneous equations where one is not linear 17a) Find a rule for the nth term of an arithmetic sequence of numbers b) Prove if a given number is a term in an arithmetic sequence 18. Solve problems for a diagram sequence by forming a rule R A G Q1. (a) Factorise y2 + 27y ........................................................... (1) (b) Simplify (t3)2 ........................................................... (1) (c) Simplify ........................................................... (1) Q2. (a) Expand and simplify 3(y – 2) + 5(2y + 1) ........................................................... (2) (b) Simplify 5u2w4 × 7uw3 ........................................................... (2) Q3. Expand and simplify (m + 7)(m + 3) ........................................................... Q4. Factorise fully 20x2 − 5 ........................................................... Q5. Prove algebraically that (2n + 1)2 − (2n + 1) is an even number for all positive integer values of n. (3) Q6. Solve x2 > 3x + 4 ...........................................................(3) Q7. Steve is asked to solve the equation 5(x + 2) = 47. Here is his working. 5(x + 2) = 47 5x + 2 = 47 5x = 45 x=9 Steve's answer is wrong. (a) What mistake did he make? ............................................................................................................................................. ............................................................................................................................................. (1) Liz is asked to solve the equation 3x2 + 8 = 83 Here is her working. 3x2 + 8 = 83 3x2 = 75 x2 = 25 x=5 (b) Explain what is wrong with Liz's answer. ............................................................................................................................................. ............................................................................................................................................. (1) Q8***. ABCD is a rectangle. EFGH is a trapezium. All measurements are in centimetres. The perimeters of these two shapes are the same. Work out the area of the rectangle. ........................................................... cm2 (5) Q9***. A school has a biathlon competition. Each athlete has to throw a javelin and run 200 metres. (a) The points scored for throwing a javelin are worked out using the formula P1 = 16(D − 3.8) where P1 is the number of points scored when the javelin is thrown a distance D metres. (i) Lottie throws the javelin a distance of 42 metres. How many points does Lottie score? (4) The points scored for running 200 metres are worked out using the formula P2 = 5(42.5 − T)2 where P2 is the number of points scored when the time taken to run 200 metres is T seconds. Suha scores 1280 points in the 200 metres. (b) (i) Work out the time, in seconds, it took Suha to run 200 metres. The formula for the number of points scored in the 200 metres should not be used for T > n. (ii) State the value of n. Give a reason for your answer. (4) Q10. A(−2, 1), B(6, 5) and C(4, k) are the vertices of a right-angled triangle ABC. Angle ABC is the right angle. Find an equation of the line that passes through A and C. Give your answer in the form ay + bx = c where a, b and c are integers. ...........................................................(5) Q11. Here is a circle, centre O, and the tangent to the circle at the point P(4, 3) on the circle. Find an equation of the tangent at the point P ...........................................................(3) Q12. Here are the equations of four straight lines. Line A Line B Line C Line D y = 2x + 4 2y = x + 4 2x + 2y = 4 2x − y = 4 Two of these lines are parallel. Write down the two parallel lines? Line ................................ and line ................................(1) Q13. Make t the subject of the formula ...........................................................(2) Q14. Solve the simultaneous equations 2x – 4y = 19 3x + 5y = 1 x = ........................................ y =.....................................(4) Q15. (a) Solve the simultaneous equations 3x + 5y = 4 2x − y = 7 (3) (b) Find the integer value of x that satisfies both the inequalities x+5>8 and 2x − 3 < 7 (3) Q16. Solve algebraically the simultaneous equations x2 + y2 = 25 y − 2x = 5 ...........................................................(5) Q17. Here are the first four terms of an arithmetic sequence. 6 10 14 18 (a) Write an expression, in terms of n, for the nth term of this sequence. ...........................................................(2) The nth term of a different arithmetic sequence is 3n + 5 (b) Is 108 a term of this sequence? Show how you get your answer. (2) Q18. The diagrams show a sequence of patterns made from grey tiles and white tiles. The number of grey tiles in each pattern forms an arithmetic sequence. (a) Find an expression, in terms of n, for the number of grey tiles in Pattern n. (2) The total number of grey tiles and white tiles in each pattern is always the sum of the squares of two consecutive whole numbers. (b) Find an expression, in terms of n, for the total number of grey tiles and white tiles in Pattern n. Give your answer in its simplest form. (3) (c) Is there a pattern for which the total number of grey tiles and white tiles is 231? Give a reason for your answer. (2) The total number of grey tiles and white tiles in any pattern of this sequence is always an odd number. (d) Explain why. (2) Mark Scheme Q1. Q2. Q3. Q4. Q5. Q6. Q7. Q8. Q9. Q10. Q11. Q12. Q13. Q14. Q15. Q16. Q17. Q18.