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Class- X Session- 2022-23 
Subject- Mathematics (Standard) 
Sample Question Paper 
Time Allowed: 3 Hrs.                                                                            Maximum Marks : 80 
General Instructions: 
  
1. This Question Paper has 5 Sections A-E.  
2. Section A  has 20 MCQs carrying 1 mark each   
3. Section B has 5 questions carrying 02 marks each.  
4. Section C has 6 questions carrying 03 marks each.  
5. Section D has 4 questions carrying 05 marks each.  
6. Section E has 3 case based integrated units of assessment (04 marks each) with sub-
parts of the values of 1, 1 and 2 marks each respectively.  
7. All Questions are compulsory. However, an internal choice in 2 Qs of 5 marks, 2 Qs 
of 3 marks and 2 Questions of 2 marks has been provided. An internal choice has 
been provided in the 2marks questions of Section E 
8. Draw neat figures wherever required. Take p =22/7 wherever required if not stated. 
 
 SECTION A 
 
 
 Section A consists of 20 questions of 1 mark each.   
S.NO
. 
 MA
RKS 
1  Let a and b be two positive integers such that a = p
3
q
4 
and b = p
2
q
3
 , where p and q are 
prime numbers. If  HCF(a,b) = p
m
q
n 
 and LCM(a,b) = p
r
q
s
, then (m+n)(r+s)=  
(a) 15 (b) 30 (c) 35 (d) 72 
 
 
1 
2 Let p be a prime number. The quadratic equation having its roots as factors of p is  
(a) x
2
 –px +p=0 (b) x
2
–(p+1)x +p=0 (c) x
2
+(p+1)x +p=0 (d) x
2
 –px+p+1=0 
 
 
1 
3 If a and ß are the zeros of a polynomial f(x) = px
2
 – 2x + 3p and a + ß  = aß, then p is 
 
(a)-2/3 (b) 2/3 (c) 1/3 (d) -1/3 
 
 
1 
4 If the system of equations 3x+y =1 and (2k-1)x +(k-1)y =2k+1 is inconsistent, then k =  
(a) -1 (b) 0 (c) 1 (d) 2 
 
 
1 
5 If the vertices of a parallelogram PQRS taken in order are P(3,4), Q(-2,3) and R(-3,-2), 
then the coordinates of its fourth vertex S are 
(a) (-2,-1) (b) (-2,-3) (c) (2,-1) (d) (1,2)   
  
 
1 
6 ?ABC~?PQR. If AM and PN are altitudes of ?ABC and ?PQR respectively and  
AB
2
: PQ
2
 = 4 : 9, then AM: PN = 
(a) 3:2 (b) 16:81 (c) 4:9 (d) 2:3 
 
    
 
1 
Page 2


Class- X Session- 2022-23 
Subject- Mathematics (Standard) 
Sample Question Paper 
Time Allowed: 3 Hrs.                                                                            Maximum Marks : 80 
General Instructions: 
  
1. This Question Paper has 5 Sections A-E.  
2. Section A  has 20 MCQs carrying 1 mark each   
3. Section B has 5 questions carrying 02 marks each.  
4. Section C has 6 questions carrying 03 marks each.  
5. Section D has 4 questions carrying 05 marks each.  
6. Section E has 3 case based integrated units of assessment (04 marks each) with sub-
parts of the values of 1, 1 and 2 marks each respectively.  
7. All Questions are compulsory. However, an internal choice in 2 Qs of 5 marks, 2 Qs 
of 3 marks and 2 Questions of 2 marks has been provided. An internal choice has 
been provided in the 2marks questions of Section E 
8. Draw neat figures wherever required. Take p =22/7 wherever required if not stated. 
 
 SECTION A 
 
 
 Section A consists of 20 questions of 1 mark each.   
S.NO
. 
 MA
RKS 
1  Let a and b be two positive integers such that a = p
3
q
4 
and b = p
2
q
3
 , where p and q are 
prime numbers. If  HCF(a,b) = p
m
q
n 
 and LCM(a,b) = p
r
q
s
, then (m+n)(r+s)=  
(a) 15 (b) 30 (c) 35 (d) 72 
 
 
1 
2 Let p be a prime number. The quadratic equation having its roots as factors of p is  
(a) x
2
 –px +p=0 (b) x
2
–(p+1)x +p=0 (c) x
2
+(p+1)x +p=0 (d) x
2
 –px+p+1=0 
 
 
1 
3 If a and ß are the zeros of a polynomial f(x) = px
2
 – 2x + 3p and a + ß  = aß, then p is 
 
(a)-2/3 (b) 2/3 (c) 1/3 (d) -1/3 
 
 
1 
4 If the system of equations 3x+y =1 and (2k-1)x +(k-1)y =2k+1 is inconsistent, then k =  
(a) -1 (b) 0 (c) 1 (d) 2 
 
 
1 
5 If the vertices of a parallelogram PQRS taken in order are P(3,4), Q(-2,3) and R(-3,-2), 
then the coordinates of its fourth vertex S are 
(a) (-2,-1) (b) (-2,-3) (c) (2,-1) (d) (1,2)   
  
 
1 
6 ?ABC~?PQR. If AM and PN are altitudes of ?ABC and ?PQR respectively and  
AB
2
: PQ
2
 = 4 : 9, then AM: PN = 
(a) 3:2 (b) 16:81 (c) 4:9 (d) 2:3 
 
    
 
1 
7 If x tan 60
°
cos 60
°
= sin60
°
cot 60
°
, then x = 
(a) cos30° 
 
(b) tan30° (c) sin30° 
 
(d) cot30° 
 
 
1 
8 
If sin? + cos? = v2, then tan? + cot ? = 
(a) 1 (b) 2 (c) 3 (d) 4 
 
 
1 
9 In the given figure, DE ? BC, AE = a units, EC =b units, DE =x units and BC = y 
units. Which of the following is true? 
 
 
 
 
(a) x= 
?? +?? ????
  
(b) y= 
????
?? +??   (c) x= 
????
?? +?? (d) 
?? ?? = 
?? ?? 
 
 
1 
10 ABCD is a trapezium with AD ? BC and AD = 4cm. If the diagonals AC and BD 
intersect each other at O such that AO/OC = DO/OB =1/2, then BC = 
(a) 6cm 
 
(b) 7cm (c) 8cm 
 
(d) 9cm 
 
 
1 
11 If two tangents inclined at an angle of 60? are drawn to a circle of radius 3cm, then the 
length of each tangent is equal to 
(a) 
3v3
2
 cm 
(b) 3cm (c) 6cm (d) 3v3cm 
 
 
1 
12 The area of  the circle that can be inscribed in a square of 6cm is 
(a) 36p cm
2 
(b) 18p  cm
2
 (c) 12 p cm
2
 (d) 9p  cm
2
 
 
  
1 
13 The sum of the length, breadth and height of a cuboid is 6v3cm and the length of its 
diagonal is 2v3cm. The total surface area of the cuboid is 
(a) 48 cm
2 
(b) 72 cm
2
 (c) 96 cm
2
 (d) 108 cm
2
 
 
 
1 
14 If the difference of Mode and Median of a data is 24, then the difference of median 
and mean is 
(a) 8 (b) 12 (c) 24 (d) 36 
 
 
1 
15 The number of revolutions made by a circular wheel of radius 0.25m in rolling a 
distance of 11km is 
(a) 2800 (b) 4000 (c) 5500 (d) 7000 
 
 
1 
16 For the following distribution,  
 
Class 0-5 5-10 10-15 15-20 20-25 
Frequency 10 15 12 20 9 
the sum of the lower limits of the median and modal class is 
(a) 15  (b) 25 (c) 30 (d) 35 
 
1 
Page 3


Class- X Session- 2022-23 
Subject- Mathematics (Standard) 
Sample Question Paper 
Time Allowed: 3 Hrs.                                                                            Maximum Marks : 80 
General Instructions: 
  
1. This Question Paper has 5 Sections A-E.  
2. Section A  has 20 MCQs carrying 1 mark each   
3. Section B has 5 questions carrying 02 marks each.  
4. Section C has 6 questions carrying 03 marks each.  
5. Section D has 4 questions carrying 05 marks each.  
6. Section E has 3 case based integrated units of assessment (04 marks each) with sub-
parts of the values of 1, 1 and 2 marks each respectively.  
7. All Questions are compulsory. However, an internal choice in 2 Qs of 5 marks, 2 Qs 
of 3 marks and 2 Questions of 2 marks has been provided. An internal choice has 
been provided in the 2marks questions of Section E 
8. Draw neat figures wherever required. Take p =22/7 wherever required if not stated. 
 
 SECTION A 
 
 
 Section A consists of 20 questions of 1 mark each.   
S.NO
. 
 MA
RKS 
1  Let a and b be two positive integers such that a = p
3
q
4 
and b = p
2
q
3
 , where p and q are 
prime numbers. If  HCF(a,b) = p
m
q
n 
 and LCM(a,b) = p
r
q
s
, then (m+n)(r+s)=  
(a) 15 (b) 30 (c) 35 (d) 72 
 
 
1 
2 Let p be a prime number. The quadratic equation having its roots as factors of p is  
(a) x
2
 –px +p=0 (b) x
2
–(p+1)x +p=0 (c) x
2
+(p+1)x +p=0 (d) x
2
 –px+p+1=0 
 
 
1 
3 If a and ß are the zeros of a polynomial f(x) = px
2
 – 2x + 3p and a + ß  = aß, then p is 
 
(a)-2/3 (b) 2/3 (c) 1/3 (d) -1/3 
 
 
1 
4 If the system of equations 3x+y =1 and (2k-1)x +(k-1)y =2k+1 is inconsistent, then k =  
(a) -1 (b) 0 (c) 1 (d) 2 
 
 
1 
5 If the vertices of a parallelogram PQRS taken in order are P(3,4), Q(-2,3) and R(-3,-2), 
then the coordinates of its fourth vertex S are 
(a) (-2,-1) (b) (-2,-3) (c) (2,-1) (d) (1,2)   
  
 
1 
6 ?ABC~?PQR. If AM and PN are altitudes of ?ABC and ?PQR respectively and  
AB
2
: PQ
2
 = 4 : 9, then AM: PN = 
(a) 3:2 (b) 16:81 (c) 4:9 (d) 2:3 
 
    
 
1 
7 If x tan 60
°
cos 60
°
= sin60
°
cot 60
°
, then x = 
(a) cos30° 
 
(b) tan30° (c) sin30° 
 
(d) cot30° 
 
 
1 
8 
If sin? + cos? = v2, then tan? + cot ? = 
(a) 1 (b) 2 (c) 3 (d) 4 
 
 
1 
9 In the given figure, DE ? BC, AE = a units, EC =b units, DE =x units and BC = y 
units. Which of the following is true? 
 
 
 
 
(a) x= 
?? +?? ????
  
(b) y= 
????
?? +??   (c) x= 
????
?? +?? (d) 
?? ?? = 
?? ?? 
 
 
1 
10 ABCD is a trapezium with AD ? BC and AD = 4cm. If the diagonals AC and BD 
intersect each other at O such that AO/OC = DO/OB =1/2, then BC = 
(a) 6cm 
 
(b) 7cm (c) 8cm 
 
(d) 9cm 
 
 
1 
11 If two tangents inclined at an angle of 60? are drawn to a circle of radius 3cm, then the 
length of each tangent is equal to 
(a) 
3v3
2
 cm 
(b) 3cm (c) 6cm (d) 3v3cm 
 
 
1 
12 The area of  the circle that can be inscribed in a square of 6cm is 
(a) 36p cm
2 
(b) 18p  cm
2
 (c) 12 p cm
2
 (d) 9p  cm
2
 
 
  
1 
13 The sum of the length, breadth and height of a cuboid is 6v3cm and the length of its 
diagonal is 2v3cm. The total surface area of the cuboid is 
(a) 48 cm
2 
(b) 72 cm
2
 (c) 96 cm
2
 (d) 108 cm
2
 
 
 
1 
14 If the difference of Mode and Median of a data is 24, then the difference of median 
and mean is 
(a) 8 (b) 12 (c) 24 (d) 36 
 
 
1 
15 The number of revolutions made by a circular wheel of radius 0.25m in rolling a 
distance of 11km is 
(a) 2800 (b) 4000 (c) 5500 (d) 7000 
 
 
1 
16 For the following distribution,  
 
Class 0-5 5-10 10-15 15-20 20-25 
Frequency 10 15 12 20 9 
the sum of the lower limits of the median and modal class is 
(a) 15  (b) 25 (c) 30 (d) 35 
 
1 
17 Two dice are rolled simultaneously. What is the probability that 6 will come up at least 
once? 
 
(a)1/6 (b) 7/36 (c) 11/36 (d) 13/36 
 
 
1 
18 
If 5 tanß =4, then 
 5 ???????? -2 cos ?? 5 sin ?? +2 cos ?? = 
 
(a) 1/3 (b) 2/5 (c) 3/5 (d) 6 
 
 
1 
 
 
 
 
 
19 
 
 
 
 
 
 
 
 
 
 
 
DIRECTION: In the question number 19 and 20, a statement of assertion (A) is 
followed by a statement of Reason (R).  
Choose the correct option 
 
Statement A (Assertion): If product of two numbers is 5780 and their HCF is 17, then 
their LCM is 340 
 
Statement R( Reason) : HCF is always a factor of LCM 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason (R) is false. 
(d) Assertion (A) is false but reason (R) is true. 
 
 
 
 
1 
 
20 
 
Statement A (Assertion): If the co-ordinates of the mid-points of the sides AB and AC 
of  ?ABC are D(3,5) and E(-3,-3) respectively, then BC = 20 units 
 
Statement R( Reason) : The line joining the mid points of two sides of a triangle is 
parallel to the third side and equal to half of it. 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason(R) is false. 
(d) Assertion (A) is false but reason(R) is true. 
 
1 
 
 
Page 4


Class- X Session- 2022-23 
Subject- Mathematics (Standard) 
Sample Question Paper 
Time Allowed: 3 Hrs.                                                                            Maximum Marks : 80 
General Instructions: 
  
1. This Question Paper has 5 Sections A-E.  
2. Section A  has 20 MCQs carrying 1 mark each   
3. Section B has 5 questions carrying 02 marks each.  
4. Section C has 6 questions carrying 03 marks each.  
5. Section D has 4 questions carrying 05 marks each.  
6. Section E has 3 case based integrated units of assessment (04 marks each) with sub-
parts of the values of 1, 1 and 2 marks each respectively.  
7. All Questions are compulsory. However, an internal choice in 2 Qs of 5 marks, 2 Qs 
of 3 marks and 2 Questions of 2 marks has been provided. An internal choice has 
been provided in the 2marks questions of Section E 
8. Draw neat figures wherever required. Take p =22/7 wherever required if not stated. 
 
 SECTION A 
 
 
 Section A consists of 20 questions of 1 mark each.   
S.NO
. 
 MA
RKS 
1  Let a and b be two positive integers such that a = p
3
q
4 
and b = p
2
q
3
 , where p and q are 
prime numbers. If  HCF(a,b) = p
m
q
n 
 and LCM(a,b) = p
r
q
s
, then (m+n)(r+s)=  
(a) 15 (b) 30 (c) 35 (d) 72 
 
 
1 
2 Let p be a prime number. The quadratic equation having its roots as factors of p is  
(a) x
2
 –px +p=0 (b) x
2
–(p+1)x +p=0 (c) x
2
+(p+1)x +p=0 (d) x
2
 –px+p+1=0 
 
 
1 
3 If a and ß are the zeros of a polynomial f(x) = px
2
 – 2x + 3p and a + ß  = aß, then p is 
 
(a)-2/3 (b) 2/3 (c) 1/3 (d) -1/3 
 
 
1 
4 If the system of equations 3x+y =1 and (2k-1)x +(k-1)y =2k+1 is inconsistent, then k =  
(a) -1 (b) 0 (c) 1 (d) 2 
 
 
1 
5 If the vertices of a parallelogram PQRS taken in order are P(3,4), Q(-2,3) and R(-3,-2), 
then the coordinates of its fourth vertex S are 
(a) (-2,-1) (b) (-2,-3) (c) (2,-1) (d) (1,2)   
  
 
1 
6 ?ABC~?PQR. If AM and PN are altitudes of ?ABC and ?PQR respectively and  
AB
2
: PQ
2
 = 4 : 9, then AM: PN = 
(a) 3:2 (b) 16:81 (c) 4:9 (d) 2:3 
 
    
 
1 
7 If x tan 60
°
cos 60
°
= sin60
°
cot 60
°
, then x = 
(a) cos30° 
 
(b) tan30° (c) sin30° 
 
(d) cot30° 
 
 
1 
8 
If sin? + cos? = v2, then tan? + cot ? = 
(a) 1 (b) 2 (c) 3 (d) 4 
 
 
1 
9 In the given figure, DE ? BC, AE = a units, EC =b units, DE =x units and BC = y 
units. Which of the following is true? 
 
 
 
 
(a) x= 
?? +?? ????
  
(b) y= 
????
?? +??   (c) x= 
????
?? +?? (d) 
?? ?? = 
?? ?? 
 
 
1 
10 ABCD is a trapezium with AD ? BC and AD = 4cm. If the diagonals AC and BD 
intersect each other at O such that AO/OC = DO/OB =1/2, then BC = 
(a) 6cm 
 
(b) 7cm (c) 8cm 
 
(d) 9cm 
 
 
1 
11 If two tangents inclined at an angle of 60? are drawn to a circle of radius 3cm, then the 
length of each tangent is equal to 
(a) 
3v3
2
 cm 
(b) 3cm (c) 6cm (d) 3v3cm 
 
 
1 
12 The area of  the circle that can be inscribed in a square of 6cm is 
(a) 36p cm
2 
(b) 18p  cm
2
 (c) 12 p cm
2
 (d) 9p  cm
2
 
 
  
1 
13 The sum of the length, breadth and height of a cuboid is 6v3cm and the length of its 
diagonal is 2v3cm. The total surface area of the cuboid is 
(a) 48 cm
2 
(b) 72 cm
2
 (c) 96 cm
2
 (d) 108 cm
2
 
 
 
1 
14 If the difference of Mode and Median of a data is 24, then the difference of median 
and mean is 
(a) 8 (b) 12 (c) 24 (d) 36 
 
 
1 
15 The number of revolutions made by a circular wheel of radius 0.25m in rolling a 
distance of 11km is 
(a) 2800 (b) 4000 (c) 5500 (d) 7000 
 
 
1 
16 For the following distribution,  
 
Class 0-5 5-10 10-15 15-20 20-25 
Frequency 10 15 12 20 9 
the sum of the lower limits of the median and modal class is 
(a) 15  (b) 25 (c) 30 (d) 35 
 
1 
17 Two dice are rolled simultaneously. What is the probability that 6 will come up at least 
once? 
 
(a)1/6 (b) 7/36 (c) 11/36 (d) 13/36 
 
 
1 
18 
If 5 tanß =4, then 
 5 ???????? -2 cos ?? 5 sin ?? +2 cos ?? = 
 
(a) 1/3 (b) 2/5 (c) 3/5 (d) 6 
 
 
1 
 
 
 
 
 
19 
 
 
 
 
 
 
 
 
 
 
 
DIRECTION: In the question number 19 and 20, a statement of assertion (A) is 
followed by a statement of Reason (R).  
Choose the correct option 
 
Statement A (Assertion): If product of two numbers is 5780 and their HCF is 17, then 
their LCM is 340 
 
Statement R( Reason) : HCF is always a factor of LCM 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason (R) is false. 
(d) Assertion (A) is false but reason (R) is true. 
 
 
 
 
1 
 
20 
 
Statement A (Assertion): If the co-ordinates of the mid-points of the sides AB and AC 
of  ?ABC are D(3,5) and E(-3,-3) respectively, then BC = 20 units 
 
Statement R( Reason) : The line joining the mid points of two sides of a triangle is 
parallel to the third side and equal to half of it. 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason(R) is false. 
(d) Assertion (A) is false but reason(R) is true. 
 
1 
 
 
 SECTION B 
 
 
 Section B consists of 5 questions of 2 marks each.   
S.No.  Marks 
21 If 49x+51y= 499, 51 x+49 y= 501, then find the value of x and y  
 
2 
22 
In the given figure below, 
AD
AE
=
AC
BD
 and ?1 = ?2.  Show that ? BAE ~ ?CAD .        
                                     
                                                                    
2 
23 In the given figure, O is the centre of circle. Find ?AQB , given that PA and PB are 
tangents to the circle and ?APB = 75°. 
 
 
2 
24 
The length of the minute hand of a clock is 6cm. Find the area swept by it when it moves 
from 7:05 p.m. to 7:40 p.m.  
 
OR 
In the given figure, arcs have been drawn of radius 7cm each with vertices A, B, C 
and D of quadrilateral ABCD as centres. Find the area of the shaded region.                               
                                               
2 
Page 5


Class- X Session- 2022-23 
Subject- Mathematics (Standard) 
Sample Question Paper 
Time Allowed: 3 Hrs.                                                                            Maximum Marks : 80 
General Instructions: 
  
1. This Question Paper has 5 Sections A-E.  
2. Section A  has 20 MCQs carrying 1 mark each   
3. Section B has 5 questions carrying 02 marks each.  
4. Section C has 6 questions carrying 03 marks each.  
5. Section D has 4 questions carrying 05 marks each.  
6. Section E has 3 case based integrated units of assessment (04 marks each) with sub-
parts of the values of 1, 1 and 2 marks each respectively.  
7. All Questions are compulsory. However, an internal choice in 2 Qs of 5 marks, 2 Qs 
of 3 marks and 2 Questions of 2 marks has been provided. An internal choice has 
been provided in the 2marks questions of Section E 
8. Draw neat figures wherever required. Take p =22/7 wherever required if not stated. 
 
 SECTION A 
 
 
 Section A consists of 20 questions of 1 mark each.   
S.NO
. 
 MA
RKS 
1  Let a and b be two positive integers such that a = p
3
q
4 
and b = p
2
q
3
 , where p and q are 
prime numbers. If  HCF(a,b) = p
m
q
n 
 and LCM(a,b) = p
r
q
s
, then (m+n)(r+s)=  
(a) 15 (b) 30 (c) 35 (d) 72 
 
 
1 
2 Let p be a prime number. The quadratic equation having its roots as factors of p is  
(a) x
2
 –px +p=0 (b) x
2
–(p+1)x +p=0 (c) x
2
+(p+1)x +p=0 (d) x
2
 –px+p+1=0 
 
 
1 
3 If a and ß are the zeros of a polynomial f(x) = px
2
 – 2x + 3p and a + ß  = aß, then p is 
 
(a)-2/3 (b) 2/3 (c) 1/3 (d) -1/3 
 
 
1 
4 If the system of equations 3x+y =1 and (2k-1)x +(k-1)y =2k+1 is inconsistent, then k =  
(a) -1 (b) 0 (c) 1 (d) 2 
 
 
1 
5 If the vertices of a parallelogram PQRS taken in order are P(3,4), Q(-2,3) and R(-3,-2), 
then the coordinates of its fourth vertex S are 
(a) (-2,-1) (b) (-2,-3) (c) (2,-1) (d) (1,2)   
  
 
1 
6 ?ABC~?PQR. If AM and PN are altitudes of ?ABC and ?PQR respectively and  
AB
2
: PQ
2
 = 4 : 9, then AM: PN = 
(a) 3:2 (b) 16:81 (c) 4:9 (d) 2:3 
 
    
 
1 
7 If x tan 60
°
cos 60
°
= sin60
°
cot 60
°
, then x = 
(a) cos30° 
 
(b) tan30° (c) sin30° 
 
(d) cot30° 
 
 
1 
8 
If sin? + cos? = v2, then tan? + cot ? = 
(a) 1 (b) 2 (c) 3 (d) 4 
 
 
1 
9 In the given figure, DE ? BC, AE = a units, EC =b units, DE =x units and BC = y 
units. Which of the following is true? 
 
 
 
 
(a) x= 
?? +?? ????
  
(b) y= 
????
?? +??   (c) x= 
????
?? +?? (d) 
?? ?? = 
?? ?? 
 
 
1 
10 ABCD is a trapezium with AD ? BC and AD = 4cm. If the diagonals AC and BD 
intersect each other at O such that AO/OC = DO/OB =1/2, then BC = 
(a) 6cm 
 
(b) 7cm (c) 8cm 
 
(d) 9cm 
 
 
1 
11 If two tangents inclined at an angle of 60? are drawn to a circle of radius 3cm, then the 
length of each tangent is equal to 
(a) 
3v3
2
 cm 
(b) 3cm (c) 6cm (d) 3v3cm 
 
 
1 
12 The area of  the circle that can be inscribed in a square of 6cm is 
(a) 36p cm
2 
(b) 18p  cm
2
 (c) 12 p cm
2
 (d) 9p  cm
2
 
 
  
1 
13 The sum of the length, breadth and height of a cuboid is 6v3cm and the length of its 
diagonal is 2v3cm. The total surface area of the cuboid is 
(a) 48 cm
2 
(b) 72 cm
2
 (c) 96 cm
2
 (d) 108 cm
2
 
 
 
1 
14 If the difference of Mode and Median of a data is 24, then the difference of median 
and mean is 
(a) 8 (b) 12 (c) 24 (d) 36 
 
 
1 
15 The number of revolutions made by a circular wheel of radius 0.25m in rolling a 
distance of 11km is 
(a) 2800 (b) 4000 (c) 5500 (d) 7000 
 
 
1 
16 For the following distribution,  
 
Class 0-5 5-10 10-15 15-20 20-25 
Frequency 10 15 12 20 9 
the sum of the lower limits of the median and modal class is 
(a) 15  (b) 25 (c) 30 (d) 35 
 
1 
17 Two dice are rolled simultaneously. What is the probability that 6 will come up at least 
once? 
 
(a)1/6 (b) 7/36 (c) 11/36 (d) 13/36 
 
 
1 
18 
If 5 tanß =4, then 
 5 ???????? -2 cos ?? 5 sin ?? +2 cos ?? = 
 
(a) 1/3 (b) 2/5 (c) 3/5 (d) 6 
 
 
1 
 
 
 
 
 
19 
 
 
 
 
 
 
 
 
 
 
 
DIRECTION: In the question number 19 and 20, a statement of assertion (A) is 
followed by a statement of Reason (R).  
Choose the correct option 
 
Statement A (Assertion): If product of two numbers is 5780 and their HCF is 17, then 
their LCM is 340 
 
Statement R( Reason) : HCF is always a factor of LCM 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason (R) is false. 
(d) Assertion (A) is false but reason (R) is true. 
 
 
 
 
1 
 
20 
 
Statement A (Assertion): If the co-ordinates of the mid-points of the sides AB and AC 
of  ?ABC are D(3,5) and E(-3,-3) respectively, then BC = 20 units 
 
Statement R( Reason) : The line joining the mid points of two sides of a triangle is 
parallel to the third side and equal to half of it. 
 
(a) Both assertion (A) and reason (R) are true and reason (R) is the correct explanation 
of assertion (A) 
(b) Both assertion (A) and reason (R) are true and reason (R) is not the correct 
explanation of assertion (A) 
(c) Assertion (A) is true but reason(R) is false. 
(d) Assertion (A) is false but reason(R) is true. 
 
1 
 
 
 SECTION B 
 
 
 Section B consists of 5 questions of 2 marks each.   
S.No.  Marks 
21 If 49x+51y= 499, 51 x+49 y= 501, then find the value of x and y  
 
2 
22 
In the given figure below, 
AD
AE
=
AC
BD
 and ?1 = ?2.  Show that ? BAE ~ ?CAD .        
                                     
                                                                    
2 
23 In the given figure, O is the centre of circle. Find ?AQB , given that PA and PB are 
tangents to the circle and ?APB = 75°. 
 
 
2 
24 
The length of the minute hand of a clock is 6cm. Find the area swept by it when it moves 
from 7:05 p.m. to 7:40 p.m.  
 
OR 
In the given figure, arcs have been drawn of radius 7cm each with vertices A, B, C 
and D of quadrilateral ABCD as centres. Find the area of the shaded region.                               
                                               
2 
 
25 If sin(A+B) =1 and cos(A-B)= v3/2, 0°< A+B = 90° and A> B, then find the 
measures of angles A and B. 
 
OR 
 
Find an acute angle ? when 
cos? - sin ?
cos?+sin ?
 = 
1-v3
1+v3
  
  
2 
 
 SECTION C 
 
 
 Section C consists of 6 questions of 3 marks each.   
S.No  Marks 
26 
Given that v3 is irrational , prove that 5 + 2v3 is irrational. 
 
3 
27 If the zeroes of the polynomial x
2
 +px +q are double in value to the zeroes of the 
polynomial 2x
2
 -5x -3, then find the values of p and q. 
 
3 
28 
A train covered a certain distance at a uniform speed. If the train would have been 6 km/h 
faster, it would have taken 4 hours less than the scheduled time. And, if the train were 
slower by 6 km/hr ; it would have taken 6 hours more than the scheduled time. Find the 
length of the journey. 
 
OR 
Anuj had some chocolates, and he divided them into two lots A and B. He sold the first 
lot at the rate of ?2 for 3 chocolates and the second lot at the rate of ?1 per chocolate, and 
got a total of ?400. If he had sold the first lot at the rate of  ?1 per chocolate, and the 
second lot at the rate of ?4 for 5 chocolates, his total collection would have been ?460. 
Find the total number of chocolates he had. 
 
3 
29 Prove the following that- 
 
   tan
3
?     +     cot
3
?     =  sec? cosec? – 2 sin? cos? 
1+ tan
2
?        1+ cot
2
? 
 
3 
30 Prove that a parallelogram circumscribing a circle is a rhombus 
 
OR 
 
3 
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Ans. Solving CBSE sample question papers for Class 10 Mathematics is important as it helps students to understand the exam pattern, marking scheme, and types of questions that can be asked in the actual exam. It also helps in identifying their strengths and weaknesses, allowing them to focus on areas that need improvement. Additionally, solving these papers helps in time management and boosts confidence for the final examination.
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Ans. To effectively use CBSE sample question papers for Class 10 Mathematics, students should start by familiarizing themselves with the syllabus and exam pattern. They should then attempt the sample papers under timed conditions to simulate the actual exam environment. After solving the papers, students should thoroughly analyze their performance, identify the mistakes made, and work on improving them. They can also refer to the provided answer keys to understand the correct approach and marking scheme.
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Ans. Yes, CBSE sample question papers for Class 10 Mathematics are available online. Students can access them through the official CBSE website or various educational websites. These papers are provided in PDF format and can be downloaded and printed for practice. It is recommended to solve the latest sample papers to ensure familiarity with the most recent exam pattern and question types.
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Ans. Solving CBSE sample question papers for Class 10 Mathematics can significantly improve the chances of scoring well in the exam, but it cannot guarantee a high score. These papers serve as a valuable practice resource and help students in understanding the question format and marking scheme. However, achieving a high score ultimately depends on consistent study, thorough understanding of concepts, and regular practice of various question types.
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Ans. CBSE sample question papers for Class 10 Mathematics are an important part of exam preparation but should not be considered as the sole resource. Along with solving these papers, students should also refer to their textbooks, study guides, and other supplementary materials to gain comprehensive knowledge of the subject. They should also practice additional questions from various sources to enhance their problem-solving skills and adaptability to different question formats.
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