II, 06-7 SUMMATIVE ASSESSMENT II, 06-7 / MATHEMATICS IX / Class IX : hours 90 Time Allowed : hours Maximum Marks: 90 YS7ZZ7.... 6 0 General Instructions:. All questions are compulsory.. The question paper consists of questions divided into four sections A, B, C and D. Section-A comprises of questions of mark each; Section-B comprises of 6 questions of marks each; Section-C comprises of 0 questions of marks each and Section-D comprises of questions of marks each.. There is no overall choice in this question paper.. Use of calculator is not permitted. / SECTION-A Question numbers to carry one mark each. y ax 7 a If the point (, ) lies on the graph of linear equation y = ax + 7, find the value of a. A fraction becomes when is subtracted from the numerator and is added to the denominator. Represent this situation as a linear equation in two variables. Construct an obtuse angle and draw its bisector. m 0 cm Find the number of small cubes with edge 0 cm that can be accommodated in a cubical box of meter edge. / SECTION-B Page of 6
5 0 Question numbers 5 to 0 carry two marks each. 5 O A, B, C D DC E BCE 85 BAD BOD In the given figure, O is the centre of the circle passing through the points A, B, C and D and DC is produced to a point E. If BCE 85, find BAD and BOD. 6 PQR QSR QR PSQ RQS ar ( PQR) cm ar ( QSR) PQR and QSR lie on same base QR. Also, PSQ RQS. If ar ( PQR) cm, find ar ( QSR). 7 O AC BD P APB 0 PBC 5 ADB In the given figure, O is the centre of the circle and chords AC and BD intersect at P such that APB 0 and PBC 5. Find the value of ADB. Page of 6
8 5 cm cm (. ) Determine the volume of a conical vessel having radius of the base as 5 cm and its slant height as cm. (Use.) 9 000 55 55 A coin is tossed 000 times with the following frequencies: Head : 55, Tail : 55 Compute the probability for each event. 0 % If probability of failure of an event is %, find the probability of success of this event. / SECTION-C 0 Question numbers to 0 carry three marks each. 5x y 6 (a) x- (b) y- Represent 5x y 6 by a graph. Write the coordinates of the point where it meets : (a) x-axis (b) y-axis x y x y How many linear equations in variables x and y can be satisfied by x and y? Determine any two of these equations. 0 cm SR Draw a line segment SR of length 0 cm. Divide it into equal parts, using compass and ruler. AB CD AC AB CD AB and CD are two parallel chords of a circle whose diameter is AC. Prove that AB CD. 5 PQRS PR QS A ar ( PSA) ar ( QAR) ar ( PAQ) ar ( SAR) Diagonals PR and QS of quadrilateral PQRS interact each other at A. Show that ar ( PSA) ar ( QAR) ar ( PAQ) ar ( SAR). Page of 6
6 00 cm How many litres of water will a hemispherical bowl of radius 00 cm contain and find its curved surface area? 7 8 8 79, 8, 5, 99,, 6, 8, 0,, 7,, 7,, 6, 7, 6, 7, ) 0-5 (5 The following are the runs made by 8 players in one day cricket match : 79, 8, 5, 99,, 6, 8, 0,, 7,, 7,, 6, 7, 6, 7, Form a frequency table for above data with equal class intervals one of these being 0-5 (excluding 5). 9 There are 00 students in a class. The mean height of the class is 50 cm. If the mean height of 60 boys is 70 cm., find the mean height of the girls in the class. / SECTION-D Question numbers to carry four marks each. x 0, y 0, x y. Draw the graphs of the following equations on the same graph sheet : x 0, y 0, x y. Also, find the area enclosed between these lines. 0 5 5 x y 5 years ago, Ramesh was 5 times as old as his son Aman was then. Let present ages (in years) of Ramesh and Aman be x and y respectively. Write the given data in form of a linear equation in two variables. Also, represent it graphically. Prove that the angle subtended by an arc of a circle at the centre is double the angle subtended by it at any point on the remaining part of the circle. EFGH EG FH, X ar( EXF) ar(exh) ar( GXF) ar( HXG) EFGH is a parallelogram with diagonals EG and FH meeting at a point X. Show that ar( EXF) ar( EXH) ar( GXF) ar( HXG) Page of 6
XYZ a XYZ O XO, YO ZO A, B C ar( XYZ) ar( ABC) XYZ is an equilateral triangle of side a units. O is a point inside XYZ such that points A, B and C are mid-points of XO, YO and ZO respectively. Find ratio of ar( XYZ) and ar( ABC). m m 55 m 7 ( ) 7 Deepika on her way to home saw some homeless persons sleeping in the park in a winter night. She gave them her canvas of area 55 m. They used it to make a conical tent with a base radius of 7 m. Assuming that all the stiching, margin and wastage incurred while cutting, amounts to approximately m, find volume of the tent that can be made with it. Which value is depicted by Deepika? (Use 7 ) 5 : : ` 5 m ` 80 A cube and cuboid have the same volume. The dimensions of the cuboid are in the ratio of : :. If the difference between the cost of polishing the cuboid and the cube at the rate of ` 5 per m is ` 80, find the edge of the cube. 6 m 0 cm 6 cm A hollow cylindrical iron pipe is m long. Its outer and inner diameters are 0 cm and 6 cm respectively. Find the volume of the iron used in making the pipe. Also find the outer surface area of pipe. 7 00 80 0-0 -9 0-60 6-80 8 9 0 (a) 50% Page 5 of 6
8 (b) (c) The marks of 00 students (out of 80) in English speaking skills was recorded as follows : Marks 0-0 -9 0-60 6-80 No. of students 8 9 0 If the passing marke are 50%, then find the probability that the student choosen at random : (a) got the passing marks. (b) failed to get the passing marks. (c) got below marks. 50-55 55-60 8 60-65 65-70 0 70-75 6 Draw a histogram and a frequency polygon for the following table : Class-intervals 50-55 55-60 60-65 65-70 70-75 Frequency 8 0 6 य/SECTION-E ( /Open Text) (* Please ensure that open text of the given theme is supplied with this question paper.) 9 Theme : Solving Mystery of messed up fields. Angles of Rehman s field are in the ratio :::. Find all the angles. 0 ABCD A C In Uttapa s field ABCD if bisects A, then prove that it also bisects C. ABCD AB, BC, CD DA P, Q, R S PQRS Let Krishna s Field is ABCD and P, Q, R and S are mid-points of sides AB, BC, CD and DA. Prove that PQRS is a parallelogram. -o0o0o0o- Page 6 of 6