高二国际班试卷2.doc

学校 班级 姓名 学号 A 密 封 线 内 请 不 要 答 题 2013——2014学年第二学期期中考试试卷 高二国际班 数学 命题人：王瑞 1、[12] (1) In the diagram，O is the centre of a circle ABCD， and BCis parallel to OD.Given that AOB is a straight line and AD is produced to E， prove that (a) AD=CD (b) (2) In the diagram，AB is a chord and P is the point of intersection of BP and the tangent ai A. If AC bisects , prove that (a) CA=CB (b) 2、[15] (1) Given that， and that A and B are in the same quadrant，evaluate (a) (b) (c) (2) The curveintegers and an amplitude of 4 and a period of The maximum value of y is 6， (a) State the value of a，b and c (b) Sketch this curve. 3、[20] (1) Given that，find the exact value of . (2) Without using a calculator，find the values of ,if is obtuse. (3) Find the maximum and minimum values of and the corresponding values of ,where . (4) Without using a calculator，express in the form . 4、(1). Given that ，find and hence，obtain the equation of the tangent to the curve at the point where the curve crosses the line .[6] (2) The tangent and the normal to the curve at the point P(7,12) cut the x-axis at points M and N respectively .Calculate the area of the triangle PMN. [7] 5、A curve has the equation ( a ) Find the gradient of the curve when . [4] ( b ) Given that x is increasing at a constant rate of 0.06 units per second, find the rate of change of y when . [6] ` 6、[10] A piece of wire of length 2400cm is used to make the edges of a rectangular box ,as shown. The box has breadth cm, length cm and height cm . ( a ) Express in terms of . ( b ) Show that the volume of the box , ,is given by. ( c ) Find the value of for which the volume is a maximum. 7、(a) Given the curve Calculate the value of for which the curve (1)meets the x-axis,(2) has turning points. [6] (b) Find the coordinates of the turning point of the curve and determine the nature of this turning point . [5] (c) Find the coordinates of the stationary point of the curve.[5] 8、(a) Prove that ： [4] (b) Differentiation ： [6] 学校 班级 姓名 学号 A 密 封 线 内 请 不 要 答 题 (c) Integration ： (1) (2) [6] 9、[18] (a) Given that evaluate (b) Show that ，hence，evaluate (c) Given that ，find (1) (2) . Find the value of the constant for which 10、[20] A curve is such that . ( a ) Given that the curve passes through the point (1, 5), find the equation of the curve. ( b) Find the x-coordinates of the stationary points of the curve. ( c) Obtain an expression for and hence, or otherwise, determine the nature of each stationary point. 高二年级 数学 第3页 共3页