Hkcee 2010 Maths Paper 2 Solution Guide

Solution to Selected Questions Question 12: In the figure, $\(O\)\( is the center of the circle and \)\(ngle AOB = 120^ rc\)\(. Find \)\(ngle ACB\)$. Step 1: Recall that the angle subtended by an arc at the center of the circle is twice the angle subtended by the same arc at any point on the circumference. Step 2: Since $\(ngle AOB = 120^ rc\)\(, \)\(ngle ACB = rac12 imes 120^ rc = 60^ rc\)$. Section C: Statistics and Probability The final section of the paper dealt with statistics and probability, featuring questions 21-40 on:

HKCEE 2010 Maths Paper 2 Solution: A Comprehensive Guide The Hong Kong Certificate of Education Examination (HKCEE) is a significant milestone for students in Hong Kong, marking the end of their secondary education. In 2010, the HKCEE maths paper 2 exam presented challenges for many students. This article aims to provide a detailed solution to the HKCEE 2010 maths paper 2, helping students understand the concepts and techniques required to excel in the exam. Overview of HKCEE 2010 Maths Paper 2 The HKCEE 2010 maths paper 2 exam consisted of 40 multiple-choice questions, testing students’ knowledge in various areas of mathematics, including algebra, geometry, trigonometry, and statistics. The paper was designed to assess students’ problem-solving skills, critical thinking, and mathematical concepts. Section A: Algebra and Graphs The first section of the paper focused on algebra and graphs. Questions 1-10 covered topics such as: hkcee 2010 maths paper 2 solution

Quadratic equations

Data analysis and interpretation Probability and statistics Solution to Selected Questions Question 12: In the

4: The probability of selecting a blue sphere is $\( rac38\)$. In conclusion, the HKCEE 2010 maths paper 2 exam demanded students to demonstrate their understanding of various mathematical concepts, such as algebra, geometry, trigonometry, and statistics. By going through the solutions to selected questions, students can obtain a clearer grasp of the techniques and strategies needed to excel in the exam. Additional Advice for Students Practice regularly to build assurance and proficiency in mathematical concepts. Revisit and comprehend the concepts assessed in the exam. Manage time effectively during the exam to ensure all items are attempted. By adopting these tips and thoroughly understanding the solutions to the HKCEE 2010 maths paper 2, students may enhance their chances of achieving in future tests. Step 2: Since $\(ngle AOB = 120^ rc\)\(,

Solution to Selected Questions Let’s take a closer look at some of the questions and their solutions: Question 1: Solve the equation $\(x^2 + 5x - 6 = 0\)$. Solution: We can factorize the quadratic equation as $\( (x + 6)(x - 1) = 0\)\(, which gives us \)\(x = -6\)\( or \)\(x = 1\)$. Question 5: The graph of $\(y = ax^2 + bx + c\)\( passes through the points \)\((0,|(0,|(0, 2)\)\(, \)\((1,| (1,|(1, 4)\)\(, and \)\((-1,|(-1,|(-1, 0)\)\(. Find the values of \)\(a\)\(,|a\)\(,|a\)\(, \)\(b\)\(,|b\)\(,|b\)\(, and \)\(c\)$. Solution: Since the graph passes through (0, 2)\)\(, we have \)\(c = 2\)\(.|c = 2\)\(.|c = 2\)\(. Using the other two points, we can form the equations: \)\(a + b + 2 = 4\)\( and \)\(a - b + 2 = 0\)\(.|a - b + 2 = 0\)\(.|a - b + 2 = 0\)\(. Solving these equations simultaneously, we get \)\(a = 1\)\(,|a = 1\)\(,|a = 1\)\(, \)\(b = 1\)\(,|b = 1\)\(,|b = 1\)\(, and \)\(c = 2\)$. Section B: Geometry and Trigonometry The second section of the paper covered geometry and trigonometry, with questions 11-20 focusing on: