Answers to this Paper must be written on the paper provided separately. You will not be allowed to write during the first 15 minutes. This time is to be spent in reading the Question Paper. The time given at the head of this Paper is the time allowed for writing the answers. Section I is compulsory. Attempt any four questions from Section II The intended marks for questions or the parts of questions given in brackets [ ]. SECTION I (40 Marks) Attempt all questions from this Section Question 1 (a) The simple interest on a sum of money for 2 years at 4% per annum is Rs. 40. Find the sum of money and the compound interest on this sum for one year payable half yearly at the same rate. [3] (b) (c) If (x – 2) is a factor of 2 x3- x2- px-2 (i) find the value of p. (ii) with the value of p, factorize the above expression completely. [4] Question 2 (a) Solve the given inequation and graph the solution on the number line. (b) In the given figure, find the area of the unshaded portion within the rectangle. [3] (c) A shopkeeper buys a camera at a discount of 20% from the wholesaler, the printed price of the camera being Rs. 1600 and the rate of sales tax is 6%.The shopkeeper sells it to the buyer at the printed price and charges tax at the same rate. Find: (i) The price at which the camera can be bought. (ii) The VAT (Value Added Tax) paid by the shopkeeper. [4] Question 3 (a) David opened a Recurring Deposit Account in a bank and deposited Rs. 300 per month for two years. If he received Rs. 7725 at the time of maturity, find the rate of interest per annum. [3] (b) (c) Use a graph paper for this question (Take 1 cm = 1 unit on both the axes). Plot the points A (-2, 0), B (4, 0), C (1, 4) and D (-2, 4). (i) Draw the line of symmetry of ? ABC. Name it L1. ii) Point D is reflected about the Line L1 to get the image E. Write the coordinates of E. (iii) Name the, figure ABED. (iv) Draw all the lines of symmetry of the figure ABED. [4] Question 4 (a) Without using tables, evaluate: (b) In the above figure, AB is parallel to Find: (i) (ii) (iii) (c) Mr. Dhoni has an account in the Union Bank of India. The following entries are from his pass book: Date Particulars Withdrawals (in Rs. ) Deposits (in Rs. ) Balance (in Rs. ) Jan 3, 07 B/F – – 2642. 00 Jan16 To self 640. 00 – 2002. 00 March 5 By cash – 850. 00 2852. 00 April 10 To Self 1130. 00 – 1722. 00 April 25By cheque – 650. 00 2372. 00 June 15 By cash 577. 00 – 1795. 00 Calculate the interest from January 2007 to June 2007 at the rate of 4% per annum. [3] SECTION B (40 Marks) Attempt any four questions from this Section. Question 5 (a) A function in x is defined , find: (i) f(-3) (ii) f (x – 1) (iii ) x if f(x)=1. [3] (b) Prove the identity: [3] (c) If A= (-4, 3) and B = (8, -6) (i) find the length of AB (ii) In what ratio is the line joining AB, divided by the x-axis? [4] Question 6 (a) Solve the following quadratic equation for x and give your answer correct to two decimal places: 5x (x + 2) = 3[3] b) In the figure given below are tangents to the circle with centre O. Calculate the values of: (i) (ii) [3] (c) A company with 4000 shares of nominal value of Rs. l10 each declares an annual dividend of I5%. Calculate: (i) The total amount of dividend paid by the company. (ii) The annual income of Shah Rukh who holds 88 shares in the company. (iii) If he received only l0% on his investment, find the price Shah Rukh paid for each share. [4] Question 7 (a) The income of Mr. Bachhan was as follows: Basic Salary : Rs. 20,000 Per month Dearness Allowance : Rs. 12,000 per month Interest from Bank : Rs. 16,000 for the whole year. Savings Contribution towards Provident Fund l5% of Basic salary . National Savings Certificate Rs. 40,000 . Contribution towards LIC premium Rs. 30,000 per year Donations. To National Defence Fund : Rs. I 2,000 (eligible for l00% tax exemption) If a sum of Rs. 3,000 was deducted every month towards Income tax from his salary for the first 11 months of the year, calculate the tax Mr. Bachhan has to pay in the last month of the financial year: Tax slabs UptoRs. 1,00,000 No tax From Rs. 1,00,001 to Rs. 1,50,000 10% of the income exceeding Rs. 1,00,000 [6] From Rs. 1,50,00 I toRs. 2,50,000 Rs. 5000 + 20% of the income exceeding Rs. 1,50,000Above Rs. 2,50,000 Rs. 25,000 + 30%o of the income exceeding Rs. 2,50,000. Deductions against savings Upto a maximum amount of Rs. 1,00,000 Education Cess 2% of the tax (b) A vertical pole and a vertical tower are on the same level ground. From the top of the pole the angle of elevation of the top of the tower is 60° and the angle of depression of the foot of the tower is 30°. Find the height of the tower if the height of the pole is 20 m. [4]. Question 8 (a) Find the H. C. F. of the given polynomials: [3] (b) Using a ruler and a pair of compasses only, construct: (i) a triangle ABC, given AB = 4 cm, BC = 6 cm and ? ABC: 90°. ii) a circle which passes through the points A, B and C and mark its centre as O. [3] (c) Points A and B have coordinates (7, -3) and (1, 9) respectively. Find (i) the slope of AB. (ii) the equation of the perpendicular bisector of the line segment AB. (iii) the value of ‘p’ if (-2, p) lies on it.[4] Question 9 Find the values of p and q. [3] (b) In ? ABC, AP : PB = 2 : 3. PO is parallel to BC and is extended to Q so that CQ is parallel to BA. Find: (i) area ? APO : area ? ABC (ii) area ? APO : area ? CQO [3] (c) The volume of a conical tent is 1232 m3 and the area of the bare floor is 154 m2. Calculate the: (i) radius of the floor. ii) height of the tent. (iii) length of the canvas required to cover this conical tent if its width is 2m. [4] Question l0 (a) In the given figure, AE and BC intersect each other at point D. If . find DE. [3] (b) A straight line AB is 8 cm long. Locate by construction the locus of a point which is: (i) Equidistant from A and B. (ii) Always 4 cm from the line AB. (iii) Mark two points X and Y, which are 4 cm from AB and equidistant from A and B, Name the figure AXBY. [3] (c)Some students planned a picnic. The budget for the food was Rs. 480. As eight of them failed to join the party, the cost of the food for each member increased by Rs. 0. Find how many students went for the picnic. [4] Question 11 (a) The weights of 50 apples were recorded as given below. Calculate mean weight, to the nearest gram, by the Step Deviation Method. Weight in gramsNo. of apples 80-855 85-858 90-9510 95-10012 100-1058 105-1104 110-1153 (b) Using a graph paper, draw an ogive for the following distribution which shows the marks obtained in the General Knowledge paper by 100 Marks0-1010-2020-3030-4040-5050-6060-7070-80 No. of Students5102025151294 Use the ogive to estimate: (i) the median. (ii) the number of students who score marks above 65 . [5]