For what value of $k$, the product of zeroes of the polynomial $kx^{2}-4x-7$ is $2$?
[1 mark]
In an A.P., if $a=8$ and $a_{10}=-19$, then value of $d$ is :
[1 mark]
The mid-point of the line segment joining the points $(-1,3)$ and $(8,\frac{3}{2})$ is:
[1 mark]
If $\sin \theta=\frac{1}{3}$ then $\sec \theta$ is equal to:
[1 mark]
HCF $(132, 77)$ is:
[1 mark]
If the roots of quadratic equation $4x^{2}-5x+k=0$ are real and equal, then value of $k$ is:
[1 mark]
If probability of winning a game is $p$, then probability of losing the game is :
[1 mark]
The distance between the points $(2,-3)$ and $(-2, 3)$ is:
[1 mark]
For what value of $\theta$, $\sin^{2}\theta+\sin \theta+\cos^{2}\theta$ is equal to $2$?
[1 mark]
A card is drawn from a well shuffled deck of $52$ playing cards. The probability that drawn card is a red queen, is:
[1 mark]
If a certain variable $x$ divides a statistical data arranged in order into two equal parts; then the value of $x$ is called the :
[1 mark]
The radius of a sphere is $\frac{7}{2}$ cm. The volume of the sphere is :
[1 mark]
The mean and median of a statistical data are $21$ and $23$ respectively. The mode of the data is :
[1 mark]
The height and radius of a right circular cone are $24$ cm and $7$ cm respectively. The slant height of the cone is :
[1 mark]
If one of the zeroes of the quadratic polynomial $(\alpha-1)x^{2}+\alpha x+1$ is $-3$, then the value of $\alpha$ is:
[1 mark]
The diameter of a circle is of length $6$ cm. If one end of the diameter is $(-4, 0)$, the other end on x-axis is at:
[1 mark]
The value of $k$ for which the pair of linear equations $5x+2y-7=0$ and $2x+ky+1=0$ don't have a solution, is :
[1 mark]
Two dice are rolled together. The probability of getting a doublet is :
[1 mark]
Directions: In Q. No. 19 and 20, a statement of Assertion (A) is followed by a statement of Reason (R). Select the correct option from the following options:
- (a) Both, Assertion (A) and Reason (R) are true. Reason (R) explains Assertion (A) completely.
- (b) Both, Assertion (A) and Reason (R) are true. Reason (R) does not explain Assertion (A).
- (c) Assertion (A) is true but Reason (R) is false.
- (d) Assertion (A) is false but Reason (R) is true.
Assertion (A): If the $PA$ and $PB$ are tangents drawn to a circle with centre $O$ from an external point $P$, then the quadrilateral $OAPB$ is a cyclic quadrilateral.
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Reason (R): In a cyclic quadrilateral, opposite angles are equal.
[1 mark]
Directions: In Q. No. 19 and 20, a statement of Assertion (A) is followed by a statement of Reason (R). Select the correct option from the following options:
- (a) Both, Assertion (A) and Reason (R) are true. Reason (R) explains Assertion (A) completely.
- (b) Both, Assertion (A) and Reason (R) are true. Reason (R) does not explain Assertion (A).
- (c) Assertion (A) is true but Reason (R) is false.
- (d) Assertion (A) is false but Reason (R) is true.
Assertion (A): Zeroes of a polynomial $p(x)=x^{2}-2x-3$ are $-1$ and $3$.
Reason (R): The graph of polynomial $p(x)=x^{2}-2x-3$ intersects x-axis at $(-1, 0)$ and $(3, 0)$.
[1 mark]
$D$ is a point on the side $BC$ of $\Delta ABC$ such that $\angle ADC=\angle BAC$. Show that $AC^{2}=BC\times DC$
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[2 marks]
(A) Solve the following pair of linear equations for $x$ and $y$ algebraically :
$x+2y=9$ and $y-2x=2$
OR
(B) Check whether the point $(-4,3)$ lies on both the lines represented by the linear equations $x+y+1=0$ and $x-y=1$.
[2 marks]
(A) Prove that $6-4\sqrt{5}$ is an irrational number, given that $\sqrt{5}$ is an irrational number.
OR
(B) Show that $11\times19\times23+3\times11$ is not a prime number.
[2 marks]
Evaluate: $\sin A \cos B + \cos A \sin B$; if $A=30^{\circ}$ and $B=45^{\circ}$
[2 marks]
A bag contains $4$ red, $5$ white and some yellow balls. If probability of drawing a red ball at random is $\frac{1}{5}$, then find the probability of drawing a yellow ball at random.
[2 marks]
Two alarm clocks ring their alarms at regular intervals of $20$ minutes and $25$ minutes respectively. If they first beep together at 12 noon, at what time will they beep again together next time?
[3 marks]
The greater of two supplementary angles exceeds the smaller by $18^{\circ}$. Find measures of these two angles.
[3 marks]
Find the co-ordinates of the points of trisection of the line segment joining the points $(-2,2)$ and $(7,-4)$.
[3 marks]
(A) In two concentric circles, the radii are $OA=r$ cm and $OQ=6$ cm, as shown in the figure. Chord $CD$ of larger circle is a tangent to smaller circle at $Q$. $PA$ is tangent to larger circle. If $PA=16$ cm and $OP=20$ cm, find the length $CD$.
IMAGE
OR
(B) In given figure, two tangents $PT$ and $QT$ are drawn to a circle with centre $O$ from an external point $T$. Prove that $\angle PTQ=2\angle OPQ$.
IMAGE
[3 marks]
(A) A solid is in the form of a cylinder with hemi-spherical ends of same radii. The total height of the solid is $20$ cm and the diameter of the cylinder is $14$ cm. Find the surface area of the solid.
OR
(B) A juice glass is cylindrical in shape with hemi-spherical raised up portion at the bottom. The inner diameter of glass is $10$ cm and its height is $14$ cm. Find the capacity of the glass. (use $\pi=3.14$)
[3 marks]
Prove that: $(\cot \theta-\operatorname{cosec} \theta)^{2}=\frac{1-\cos \theta}{1+\cos \theta}$
[3 marks]
(A) If a line is drawn parallel to one side of a triangle to intersect the other two sides in distinct points, then prove that other two sides are divided in the same ratio.
OR
(B) Sides $AB$ and $AC$ and median $AD$ of a $\Delta ABC$ are respectively proportional to sides $PQ$ and $PR$ and median $PM$ of $\Delta PQR$. Show that $\Delta ABC \sim \Delta PQR$.
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[5 marks]
How many terms of the A.P. $27, 24, 21, \dots$ must be taken so that their sum is $105$? Which term of the A.P. is zero?
[5 marks]
(A) The shadow of a tower standing on a level ground is found to be $40$ m longer when the Sun's altitude is $30^{\circ}$ than when it was $60^{\circ}$. Find the height of the tower and the length of original shadow. (use $\sqrt{3}=1.73$)
OR
(B) The angles of depression of the top and the bottom of an $8$ m tall building from the top of a multi-storeyed building are $30^{\circ}$ and $45^{\circ}$ respectively. Find the height of the multi-storeyed building and the distance between the two buildings. (use $\sqrt{3}=1.73$)
[5 marks]
A chord of a circle of radius $14$ cm subtends an angle of $90^{\circ}$ at the centre. Find the area of the corresponding minor and major segments of the circle.
[5 marks]
To keep the lawn green and cool, Sadhna uses water sprinklers which rotate in circular shape and cover a particular area. The diagram below shows the circular areas covered by two sprinklers :
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Two circles touch externally. The sum of their areas is $130\pi$ sq m and the distance between their centres is $14$ m.
Based on above information, answer the following questions :
(i) Obtain a quadratic equation involving $R$ and $r$ from above.
(ii) Write a quadratic equation involving only $r$.
(iii) (a) Find the radius $r$ and the corresponding area irrigated.
OR
(b) Find the radius $R$ and the corresponding area irrigated.
[4 marks]
Gurpreet is very fond of doing research on plants. She collected some leaves from different plants and measured their lengths in mm.
IMAGE
The data obtained is represented in the following table:
| Length (in mm) : | $70-80$ | $80-90$ | $90-100$ | $100-110$ | $110-120$ | $120-130$ | $130-140$ |
| Number of leaves : | $3$ | $5$ | $9$ | $12$ | $5$ | $4$ | $2$ |
Based on the above information, answer the following questions:
(i) Write the median class of the data.
(ii) How many leaves are of length equal to or more than $10$ cm?
(iii) (a) Find median of the data.
OR
(b) Write the modal class and find the mode of the data.
[4 marks]
The picture given below shows a circular mirror hanging on the wall with a cord. The diagram represents the mirror as a circle with centre $O$. $AP$ and $AQ$ are tangents to the circle at $P$ and $Q$ respectively such that $AP=30$ cm and $\angle PAQ=60^{\circ}$
IMAGE
Based on the above information; answer the following questions :
(i) Find the length $PQ$.
(ii) Find $\angle POQ$
(iii) (a) Find the length $OA$.
OR
(b) Find the radius of the mirror.
[4 marks]