General Instructions:
Read the following instructions very carefully and strictly follow them:
(i)This question paper contains 38 questions. All questions are compulsory.
(ii)This question paper is divided into five Sections - A, B, C, D and E.
(iii) In Section A, Questions no. 1 to 18 are multiple choice questions (MCQs) and questions number 19 and 20 are Assertion-Reason based questions of 1 mark each.
(iv) In Section B, Questions no. 21 to 25 are very short answer (VSA) type questions, carrying 2 marks each.
(v) In Section C, Questions no. 26 to 31 are short answer (SA) type questions, carrying 3 marks each.
(vi) In Section D, Questions no. 32 to 35 are long answer (LA) type questions carrying 5 marks each.
(vii) In Section E, Questions no. 36 to 38 are case study based questions carrying 4 marks each. Internal choice is provided in 2 marks questions in each case study.
(viii) There is no overall choice. However, an internal choice has been provided in 2 questions in Section B, 2 questions in Section C, 2 questions in Section D and 3 questions in Section E.
(ix) Draw neat diagrams wherever required. Take n = = wherever required, if not stated.
(X) Use of calculator is not allowed.
SECTION A
This section has 20 Multiple Choice Questions (MCQs) carrying 1 mark each.
(20x1 =20)
If the sum of zeroes of the polynomial $p(x)=2x^{2}-k\sqrt{2}x+1$ is $\sqrt{2}$, then value of k is:
[1 mark]
If the probability of a player winning a game is 0.79, then the probability of his losing the same game is :
[1 mark]
If the roots of equation $ax^{2}+bx+c=0$, $a \ne 0$ are real and equal, then which of the following relation is true ?
[1 mark]
In an A.P., if the first term $a=7$, nth term $a_{n}=84$ and the sum of first n terms $s_{n}=\frac{2093}{2}$, then n is equal to:
[1 mark]
If two positive integers p and q can be expressed as $p=18a^{2}b^{4}$ and $q=20~a^{3}b^{2}$, where a and b are prime numbers, then LCM (p, q) is :
[1 mark]
AD is a median of $\Delta ABC$ with vertices $A(5,-6)$, $B(6,4)$ and $C(0,0)$. Length AD is equal to:
[1 mark]
If $\sec~\theta-\tan~\theta=m$, then the value of $\sec~\theta+\tan~\theta$ is:
[1 mark]
From the data 1, 4, 7, 9, 16, 21, 25, if all the even numbers are removed, then the probability of getting at random a prime number from the remaining is :
[1 mark]
For some data $x_{1}, x_{2},......x_{n}$ with respective frequencies $f_{1},f_{2},......f_{n}$, the value of $\sum_{1}^{n}f_{i}(x_{i}-\overline{x})$ is equal to:
[1 mark]
The zeroes of a polynomial $x^{2}+px+q$ are twice the zeroes of the polynomial $4x^{2}-5x-6$. The value of p is :
[1 mark]
If the distance between the points $(3,-5)$ and $(x,-5)$ is 15 units, then the values of x are:
[1 mark]
If $\cos(\alpha+\beta)=0$, then value of $\cos(\frac{\alpha+\beta}{2})$ is equal to :
[1 mark]
A solid sphere is cut into two hemispheres. The ratio of the surface areas of sphere to that of two hemispheres taken together, is :
[1 mark]
The middle most observation of every data arranged in order is called :
[1 mark]
The volume of the largest right circular cone that can be carved out from a solid cube of edge 2 cm is:
[1 mark]
Two dice are rolled together. The probability of getting sum of numbers on the two dice as 2, 3 or 5, is:
[1 mark]
The centre of a circle is at (2, 0). If one end of a diameter is at (6, 0), then the other end is at :
[1 mark]
In the given figure, graphs of two linear equations are shown. The pair of these linear equations is :
IMAGE
[1 mark]
Directions: In Q. No. 19 and 20 a statement of Assertion (A) is followed by a statement of Reason (R). Choose the correct option.
(a) Both, Assertion (A) and Reason (R) are true and Reason (R) is correct explanation of Assertion (A).
(b) Both, Assertion (A) and Reason (R) are true but Reason (R) is not correct explanation for Assertion (A).
(c) Assertion (A) is true but Reason (R) is false.
(d) Assertion (A) is false but Reason (R) is true.
Assertion (A): The tangents drawn at the end points of a diameter of a circle, are parallel.
Reason (R): Diameter of a circle is the longest chord.
[1 mark]
Assertion (A): If the graph of a polynomial touches x-axis at only one point, then the polynomial cannot be a quadratic polynomial.
Reason (R): A polynomial of degree $n(n>1)$ can have at most n zeroes.
[1 mark]
SECTION B
This section has 5 Very Short Answer (VSA) type questions carrying 2 marks each.
(5x2 =10)
Solve the following system of linear equations $7x-2y=5$ and $8x+7y=15$ and verify your answer.
[2 marks]
In a pack of 52 playing cards one card is lost. From the remaining cards, a card is drawn at random. Find the probability that the drawn card is queen of heart, if the lost card is a black card.
[2 marks]
Evaluate: $2\sqrt{2}\cos~45^{\circ}\sin~30^{\circ}+2\sqrt{3}\cos~30^{\circ}$
[2 marks]
If $A=60^{\circ}$ and $B=30^{\circ}$, verify that :
$\sin(A+B)=\sin~A~\cos~B+\cos~A~\sin~B$
[2 marks]
In the given figure, ABCD is a quadrilateral. Diagonal BD bisects $\angle B$ and $\angle D$ both. Prove that:
(i) $\Delta ABD\sim\Delta CBD$
(ii) $AB=BC$
[2 marks]
Prove that $5-2\sqrt{3}$ is an irrational number. It is given that $\sqrt{3}$ is an irrational number.
[2 marks]
Show that the number $5\times11\times17+3\times11$ is a composite number.
[2 marks]
Find the ratio in which the point $(\frac{8}{5},y)$ divides the line segment joining the points (1, 2) and (2, 3). Also, find the value of y.
[3 marks]
ABCD is a rectangle formed by the points $A(-1,-1)$, B (-1, 6), C (3, 6) and D (3, -1). P, Q, R and S are mid-points of sides AB, BC, CD and DA respectively. Show that diagonals of the quadrilateral PQRS bisect each other.
[3 marks]
In a teachers' workshop, the number of teachers teaching French, Hindi and English are 48, 80 and 144 respectively. Find the minimum number of rooms required if in each room the same number of teachers are seated and all of them are of the same subject.
[3 marks]
Prove that: $\frac{\tan~\theta}{1-\cot~\theta}+\frac{\cot~\theta}{1-\tan~\theta}=1+\sec~\theta~\csc~\theta$
[3 marks]
Three years ago, Rashmi was thrice as old as Nazma. Ten years later, Rashmi will be twice as old as Nazma. How old are Rashmi and Nazma now?
[3 marks]
In the given figure, AB is a diameter of the circle with centre O. AQ, BP and PQ are tangents to the circle. Prove that $\angle POQ=90^{\circ}$.
IMAGE
[3 marks]
A circle with centre O and radius 8 cm is inscribed in a quadrilateral ABCD in which P, Q, R, S are the points of contact as shown. If AD is perpendicular to DC, $BC=30$ cm and $BS=24$ cm, then find the length DC.
IMAGE
[3 marks]
The difference between the outer and inner radii of a hollow right circular cylinder of length 14 cm is 1 cm. If the volume of the metal used in making the cylinder is $176~cm^{3}$, find the outer and inner radii of the cylinder.
[3 marks]
An arc of a circle of radius 21 cm subtends an angle of $60^{\circ}$ at the centre. Find :
(i) the length of the arc.
(ii) the area of the minor segment of the circle made by the corresponding chord.
[5 marks]
The sum of first and eighth terms of an A.P. is 32 and their product is 60. Find the first term and common difference of the A.P. Hence, also find the sum of its first 20 terms.
[5 marks]
In an A.P. of 40 terms, the sum of first 9 terms is 153 and the sum of last 6 terms is 687. Determine the first term and common difference of A.P. Also, find the sum of all the terms of the A.P.
[5 marks]
If a line is drawn parallel to one side of a triangle to intersect the other two sides in distinct points, then prove that the other two sides are divided in the same ratio.
[5 marks]
In the given figure PA, QB and RC are each perpendicular to AC. If $AP=x$, $BQ=y$ and $CR=z$, then prove that $\frac{1}{x}+\frac{1}{z}=\frac{1}{y}$
- - - - INSERT IMAGE HERE - - - -[5 marks]
A pole 6m high is fixed on the top of a tower. The angle of elevation of the top of the pole observed from a point P on the ground is $60^{\circ}$ and the angle of depression of the point P from the top of the tower is $45^{\circ}$ Find the height of the tower and the distance of point P from the foot of the tower. (Use $\sqrt{3}=1.73)$
[5 marks]
A rectangular floor area can be completely tiled with 200 square tiles. If the side length of each tile is increased by 1 unit, it would take only 128 tiles to cover the floor.
(i) Assuming the original length of each side of a tile be x units, make a quadratic equation from the above information.
(ii) Write the corresponding quadratic equation in standard form.
(iii) (a) Find the value of x, the length of side of a tile by factorisation.
OR
(b) Solve the quadratic equation for x, using quadratic formula.
IMAGE
[4 marks]
BINGO is game of chance. The host has 75 balls numbered 1 through 75. Each player has a BINGO card with some numbers written on it. The participant cancels the number on the card when called out a number written on the ball selected at random. Whosoever cancels all the numbers on his/her card, says BINGO and wins the game. The table given below, shows the data of one such game where 48 balls were used before Tara said 'BINGO'.
| Numbers announced | Number of times |
| 0-15 | 8 |
| 15-30 | 9 |
| 30-45 | 10 |
| 45-60 | 12 |
| 60-75 | 9 |
Based on the above information, answer the following:
(i) Write the median class.
(ii) When first ball was picked up, what was the probability of calling out an even number ?
(iii) (a) Find median of the given data.
OR
(b) Find mode of the given data.
[4 marks]
A backyard is in the shape of a triangle ABC with right angle at B. $AB=7~m$ and $BC=15$ m. A circular pit was dug inside it such that it touches the walls AC, BC and AB at P, Q and R respectively such that $AP=xm.$
IMAGE
Based on the above information, answer the following questions:
(i) Find the length of AR in terms of x.
(ii) Write the type of quadrilateral BQOR.
(iii) (a) Find the length PC in terms of x and hence find the value of x.
OR
(b) Find x and hence find the radius r of circle.
[4 marks]