SAMPLE PAPER - 2008
Class - X
SUBJECT - MATHEMATICS
Marks: 80 Time: 3 Hrs
SECTION-A
- Prove that tan θ(1 - sin²θ) = sin θ cos θ.
- Prove that 1 - tan²θ = tan²θ, θ ╪ 45.
cot²θ – 1
- Show that 5 + √2 is irrational.
- Express 22/ 8 as a decimal fraction. (2.75)
- The diameter of a circular pond is 17.5m. It is surrounded by a path of width 3.5m. Find the area of the path. (220m²)
- An arc of circle of radius 12m, subtends an angle of 150º at the centre, find the length of major arc. (10πcm)
- A bag contains 4 red, 5 black, and 6 white balls. A ball is drawn from the bag at random. Find the probability that the ball drawn is
a) Red b) black or white c) not black (7/15, 8/15, 2/5)
8) Evaluate cos 80 + cos59 X cosec31. (2)
Sin10
- Find the co – ordinates of the circumcenter of a triangle whose vertices are (8, 6) , (8, 2) and (2, - 2). Also find its circumradius. { (5, 2), 5}
- Show that -1, 3, 6 are zeroes of polynomial p(x) = x³ - 8x² + 9x + 18. Also verify the relationship between the zeroes and the coefficients of p(x)
SECTION-B
- Solve 3a - 2b + 5 = 0, a + 3b - 2 = 0. (-a, b)
X y x y
12) Ritu can row downstream 20km in 2hours and upstream 4km in 2 hours. Fi
nd her speed in rowing in still water and speed of the current. (6km/hr, 4km/hr)
13) Prove that tanA + cotA = 1 + secA . cosecA.
1 – cot A 1 – tanA
14) The 3rd term of an AP is 7 and 7th term exceeds 3times the 3rd time, by 2. Find 1st term, CD and sum of 1st 20 terms. (-1, 4, 740)
15) Find sum of all three digit numbers which leave remainder 1 when divided by 4.
(123525)
SECTION-C
16) Solve by the method of cross multiplication.
(a – b)x + (a + b)y = a² - 2ab - b². (a + b)², - 2ab
(a + b) (x + y) = a² + b². a +b
17) Ratio between girls and boys in a class of 40 students is 2:3. Five new students joined the class. How many of them must be boys so that the ratio between girls and boys become 4:5? (1)
18) ABCQ is a quadrant of a circle of radius 14cm. With AC as diameter a semicircle is drawn. Find the area of the shaded portion. (98cm²)
Q
A
C
B
19) Show that the tangents at the extremities of any chord make equal angles with the chord.
20) In the figure AO = BO = ½, AB = 5cm. Find DC. (10cm)
OC OD
B
A
O
C
D
21) If A and B are the points (-2, -2) and (2, 4) respectively, find co ordinates of P such that AP = 3/7 AB. (-2/7, -20/7)
22) Prove that diagonals of a rectangle bisect each other and are of equal length.
23) An unbiased dice is tossed.
a) Write the sample space of the experiment.
b) Find the probability of getting a number greater than 4 (1/3)
c) Find the probability of getting a prime number. (1/2)
24) From a pack of well shuffled cards, a card is drawn. What is the probability that the card drawn is an ace? What is the probability that the card drawn is a black ace? (1/13, 1/26)
25) Two stations due south of a leaning tower, which leaves towards north are at a distances a and b from its foot. If α, β be the elevations of the top of the tower from these stations, prove that its inclinations θ to the horizontal is given by
Cot θ = b cot α – a cot β
b – a
SECTION-D
26) The angle of elevation of the vertical tower PQ from a point x on the ground is 60º. At a point Y, 40m vertically above X, the angle of elevation of the top is 45º. Calculate the height of the tower. (94.64m)
27) A hollow cone is cut by a plane parallel to the base and the upper portion is removed. If the curved surface of the remainder is 8/9 of the curved surface of the whole cone, find the line segment in to which the cone’s altitude is divided by the plane. (1/2)
28) Draw a less than and more than ogive of the following.
Marks | 30-39 | 40-49 | 50-59 | 60-69 | 70-79 | 80-89 | 90-99 |
No. of students | 14 | 6 | 10 | 20 | 30 | 8 | 12 |
29) Prove that the length of tangent drawn from an external to a circle are of equal length, and hence show that the in circle of ∆ ABC touches the sides BC, CA and AB at D, E, F respectively. Show that AF + BD + CE = AE +CD + BF = ½ x perimeter of ∆ ABC.
30) Prove that the ratio of areas of 2 similar triangles is equal to the ratio of square on their corresponding sides. Using this theorem find the ratio of heights of 2 isosceles triangles having equal vertical angles of ratio of their areas is 4 : 25.
Draw ∆ ABC with sides BC = 7cm, AB = 6cm, ∟ABC = 45º. Construct a triangle whose sides are 2/3 of the corresponding sides of ∆ ABC.
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