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1 MODEL TEST PAPER 6 FIRST TERM (SA-I) MATHEMATICS (With ~nszuers) CLASS X 'R'nze Allowed : 3 to 3% Hours] LMaximum Marks : 80 General Instructions : (i) All questions are compulsory. (ii) The question paper consists of 34 questions divided into four sections A; B, C and D. Section A comprises of 0 questions of mark each, Section B comprises of 8 questions of 2 marks each, Section C comprises -of 0 questions of 3 marks each and' Section D~, comprises of 6 questions of 4 marks each. (iii) Question numbers I to 0 in Section A are multiple choice questions where you are to select one correct option out of the given four. (iv) There is no overall choice. However, internal choice has been provided in question of tuo marks, 3 questions of three marks each and 2 questions offour marks each. You have to attempt only one of the alternatives in all such questions. (u) Use of calculators is not permitted. - Question numbers to 0 are of one mark each.. If 8 and 30-30" are acute angles such that sin 8 = cos (38-30 ), then tan 8 is equa,to (a) (b) - (c) &., (dl 2. If x tan 45" cos 60" = sin 60" cot 60, then x is equal to (a) (b) & A0 BO 3. In figure, - = - = - and AB = 5 cm, then the value of DC is OC OD 2 (c) 7.5 cm 4. The value of 3 tan2 32" -3 cosec2 58" is (dl 2.5 cm

2 2 2 cosec 8 - sec e. 5. Given that tan 8 = -, the value of IS A cosec2 0 + sec2 8 (a)- (b) (c) - (dl The decimal expansion of - mll terminate after how many places of decimal? 20 (a) 2 (b) (c) 3 (dl 4 7. If a, b are both positive rational numbers, then (& + A)(& - A) is (a) a rational number (b) an irrational number (c) neither rational nor irrational number (d) both rational as well as irrational number 8. In figure, the graph of a polynomial p(x) is shorn. The number of zeroes of p(x) is Y + Y' (a) 5 (b) (c) 7 (d) 3 9. A student draws a cumulative frequency curve for the marks obtained by 40 students of a class as shown below. Then the median marks obtained by the student of the class is

3 (a) 5 (b) 52 (c) 53 (d) The pair of linear equations 5x + 7y = 29 and y = 7 have (a) one solution (c) many solutions (b) two solutions (d) no solution I;. Sii&b&'BC. Question numbers to 8 carry 2 marks each.. If the product of zeroes of the polynomial kx2 + 9x + 20 is 6, find the value of k. 2. Prove that 6 is an irrational. 3. If 7 cos sin2 0 = 6, show that tan 0.= - 43' -cose Prove that : (cosec 0 - cot o )~ = l-ecose' 4. For what value of k will the following system of equations has infinitely many solutions : (2k + l)x + (k + 2)y = lz - 5. ABC is a right triangle right angled at C. Ifp is the length of the perpendicular from C to AB and a, b, c have the usual meaning, then prove that (i) pc = ab (ii) 7 = p a b2' 6. BL and CM are medians of a triangle ABC right-angled-at A. Prove that ~(BL' + CM') = 5BC2 C :, A M B 7. The following cumulative frequency distribution gives daily wages.of workers. ' Less Daily tuages (in 7) Less than 55 Less than 60 Less than 65 ' than 70 Less than 75 Less than 80 Less than 00 Number of workers Write the above cumulative frequency distribution as frequency distribution. - ~~.

4 20. Prove that 5fi is an irrational number. 3 Or Prove that & + is an irrational number pens and 53 pencils together cost f 320, while 53 pens and 37 pencils together cost f 400. Find the cost of a pen and that of a pencil. Or. The area of a rectangle gets reduced by 9 square units if its length is reduced by 5 units and the breadth is increased by 3 units. Ifwe increase the length by 3 units and breadth by 2 units, the area is increased by 67 square units. Find the length and breadth of the rectangle. 22. If a and p are the zeroes of th'e quadratic polynomial : p(r) = ax2 + bx + c, then evaluate : a4 + p4 23. Prove that : sine + = sec 0 cosec 0 + cot 0 -cos0 +cose 24. Prove that : cos A + Sin A = cos A + sin A. -tana -cota 25. ABC is a triangle in which AB = AC and D is a point on AC such that BC' = AC x CD. Prove that BD = BC. 26. From a point 0 in the interior of a MC, perpendicular OD, OE and OF are dram' on the sides BC, CA and AB respectively. Prove that A B D C 27. Find mean of the following frequency distribution using step-deviation method : (i) AF' + BD' + CE' = OA2 + 0B2 + 0c2-0D2 - OE' - (ii) AF' + BD~ + CE2 =AE' + CD' + BF~ Classes ' I Frequency Or The mean of the following distribution is Find the value of x. Classes Frequency I x 2 -

5 Or The mean of the following distribution is 54. Find the value ofp. Classes 0-20 Frequency 8 Number of letters Number of surnames P surnames were randomly picked up from local telephone directory and the frequency distribution of the number of letters in the English alphabets in the.surnames was obtained as follows : Determine the median number of letters in the surnames. )jzi&q Question numbers 29 to 34 carry 4 marks each If two zeroes of the polynomial x4-6x3-26x2 + 38x - 35 are 2 2 &, find other zeroes. 30. Prove that the ratio of areas of two similar triangles is equal to the square of the ratio of their corresponding sides. or. f.a line is drawn parallel to one side of a triangle to intersect the other two sides in distinct points, the other two sides are divided in the same ratio. Prove this theorem. 3. Prove that : cosec 0. sec (90"- 0) - cot 0. tan (90"- 3) + sinz 32" + sin2 58" Evaluate : tan 3" tan 22" tan 45" tan 68" tan 87" - tan2 32" + cosec2 58" 32. The median of the following data is Find the values ofx andy if the total frequenq is 00. Class Interual Frequency 0-0 I Prove that : --=-- cosec x - cot x sin x sin x cosec x +cot x

6 34. Draw the graph of the following equations on the same graph paper : 2z-y=2 & -y =.8 Also,find the coordinates of the points where the lines meet the of x. " ANSY\$E,R:S:: -~ Section 'A'. (d) 2. (a) 3. (b) 4. (c) 5. (c) 6. (c) 7. (a) 8. (b) ~~ 9. (dl 0. (a) Section 'B' 8. Mode = k = 4 Daily wages (in f ) Section 'C' 2. Cost of one pen = f 6.50, Cost of one pencil = f.50.or Length = 7 units, Breadth = 9 units No. of students frequency Median = 8.05 Section 'D', 29. Other zeroes are 7 and Or 32. x=9andy=5 34. x = 3, y = 4; (,O) and (2,O) 27. Mean = 25 Or p = 2

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