mathhl_p2_m06_tz0

mathhl_p2_m06_tz0 - 2 hours IB DIPLOMA PROGRAMME PROGRAMME...

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IB DIPLOMA PROGRAMME PROGRAMME DU DIPLÔME DU BI PROGRAMA DEL DIPLOMA DEL BI M06/5/MATHL/HP2/ENG/TZ0/XX MATHEMATICS HIGHER LEVEL PAPER 2 Thursday 4 May 2006 (morning) INSTRUCTIONS TO CANDIDATES ± Do not open this examination paper until instructed to do so. ± Answer all the questions. ± Unless otherwise stated in the question, all numerical answers must be given exactly or correct to three signifcant fgures. 2206-7205 5 pages 2 hours 22067205
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M06/5/MATHL/HP2/ENG/TZ0/XX 2206-7205 – 2 – Please start each question on a new page. Full marks are not necessarily awarded for a correct answer with no working. Answers must be supported by working and/or explanations. In particular, solutions found from a graphic display calculator should be supported by suitable working, e.g. if graphs are used to ±nd a solution, you should sketch these as part of your answer. Where an answer is incorrect, some marks may be given for a correct method, provided this is shown by written working. You are therefore advised to show all working. 1. [Maximum mark: 21] Let A be the point ( , , ) 2 1 0 , B the point ( , , ) 3 0 1 and C the point (1, m , 2) , where m m < ¢ , 0.
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This note was uploaded on 06/22/2010 for the course COMCC 05123 taught by Professor Mcgee during the Spring '10 term at York County CC.

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mathhl_p2_m06_tz0 - 2 hours IB DIPLOMA PROGRAMME PROGRAMME...

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