1. 1. Solve the inequality [4] (nov2003) 2. Given that = 1 and Hence determine the values of , obtain two linear equations in and . and . [4] (june2004) 3. Solve the inequality [4] (nov2004) 4. (a) Given the function , state (i) the coordinates of the turning point, [1] (ii) the nature of the turning point. [1] (b) Given that the equation + = 11 is solved by using the substitution (i) reduce the equation to a quadratic in (ii) hence solve the original equation. 5. Solve the inequality [3] [3] (nov2004) [4] (june2005) 1. Solve the inequality │ │ . 2. Find the exact value of the solution to the equation 1. [3] [3] (a) Solve the inequality [3] (b) Solve the equation [4] (june2009) 1. Express Find the value of in partial fractions. [4] which satisfies the equation [5] Express in partial fractions. Solve the following equations (a) (b) [5] [5] [3]