Class 9 Exam  >  Class 9 Notes  >  Class 9 Math: Sample Question Paper- 12 (With Solutions)

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7 	 / 	 2 8
C B S E 	 C l a s s 	 9 	 M a t h e m a t i c s
S a m p l e 	 P a p e r 	
S o l u t i o n
S e c t i o n - A
( Q u e s t i o n 	 n u m b e r s 	 1 	 t o 	 6 	 c a r r y 	 1 	 m a r k 	 e a c h )
1 . 	 I f 	 x
a / b
= 1 , 	 t h e n 	 f i n d 	 t h e 	 v a l u e 	 o f 	 ‘ a ’ .
A n s w e r : 	 a 	 = 	 0
S i n c e 	 a / b 	 = 0 	 , 	 t h e n 	 x
0
= 1
2 . 	 I f 	 p ( x ) 	 = 	 2 x
3
	 + 	 5 x
2
	 – 	 3 x 	 - 2 	 i s 	 d i v i d e d 	 b y 	 x - 1 , 	 t h e n 	 f i n d 	 t h e 	 r e m a i n d e r .
A n s w e r : 	 2
p ( 1 ) 	 i s 	 t h e 	 r e m a i n d e r .
p ( 1 ) 	 = 	 2 ( 1 )
3
	 + 	 5 ( 1 )
2
	 – 	 3 ( 1 ) 	 - 2 	 = 	 2 	 + 	 5 	 - 3 	 - 2 	 = 	 2
3 . 	 T h e 	 d i s t a n c e 	 o f 	 t h e 	 p o i n t 	 ( 0 , 	 - 1 ) 	 f r o m 	 t h e 	 o r i g i n 	 i s 	 _ _ _ _ _ _ _ _ . 	
A n s w e r : 	 1
d 	 = 	
= 	
= 	 	 1
4 . 	 I f 	 t h e 	 v e r t i c a l 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 i s 	 1 0 0
0
, 	 t h e n 	 f i n d 	 t h e 	 m e a s u r e s 	 o f 	 i t s
b a s e 	 a n g l e s .
A n s w e r : 	 4 0
°
	 , 	 4 0
°
L e t 	 m e a s u r e 	 o f 	 e a c h 	 b a s e 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 b e 	 x .
T h e r e f o r e , 	 w e 	 h a v e
1 0 0
°
	 + 	 x 	 + 	 x 	 = 	 1 8 0
°
	 	 2 x 	 = 	 1 8 0
°
	 – 	 1 0 0
°
	 	 x 	 = 	 4 0
°
.
Page 2


7 	 / 	 2 8
C B S E 	 C l a s s 	 9 	 M a t h e m a t i c s
S a m p l e 	 P a p e r 	
S o l u t i o n
S e c t i o n - A
( Q u e s t i o n 	 n u m b e r s 	 1 	 t o 	 6 	 c a r r y 	 1 	 m a r k 	 e a c h )
1 . 	 I f 	 x
a / b
= 1 , 	 t h e n 	 f i n d 	 t h e 	 v a l u e 	 o f 	 ‘ a ’ .
A n s w e r : 	 a 	 = 	 0
S i n c e 	 a / b 	 = 0 	 , 	 t h e n 	 x
0
= 1
2 . 	 I f 	 p ( x ) 	 = 	 2 x
3
	 + 	 5 x
2
	 – 	 3 x 	 - 2 	 i s 	 d i v i d e d 	 b y 	 x - 1 , 	 t h e n 	 f i n d 	 t h e 	 r e m a i n d e r .
A n s w e r : 	 2
p ( 1 ) 	 i s 	 t h e 	 r e m a i n d e r .
p ( 1 ) 	 = 	 2 ( 1 )
3
	 + 	 5 ( 1 )
2
	 – 	 3 ( 1 ) 	 - 2 	 = 	 2 	 + 	 5 	 - 3 	 - 2 	 = 	 2
3 . 	 T h e 	 d i s t a n c e 	 o f 	 t h e 	 p o i n t 	 ( 0 , 	 - 1 ) 	 f r o m 	 t h e 	 o r i g i n 	 i s 	 _ _ _ _ _ _ _ _ . 	
A n s w e r : 	 1
d 	 = 	
= 	
= 	 	 1
4 . 	 I f 	 t h e 	 v e r t i c a l 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 i s 	 1 0 0
0
, 	 t h e n 	 f i n d 	 t h e 	 m e a s u r e s 	 o f 	 i t s
b a s e 	 a n g l e s .
A n s w e r : 	 4 0
°
	 , 	 4 0
°
L e t 	 m e a s u r e 	 o f 	 e a c h 	 b a s e 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 b e 	 x .
T h e r e f o r e , 	 w e 	 h a v e
1 0 0
°
	 + 	 x 	 + 	 x 	 = 	 1 8 0
°
	 	 2 x 	 = 	 1 8 0
°
	 – 	 1 0 0
°
	 	 x 	 = 	 4 0
°
.
8 	 / 	 2 8
5 . 	 T h e 	 r a t i o 	 o f 	 t h e 	 w h o l e 	 s u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 s p h e r e 	 a n d 	 a 	 s o l i d 	 h e m i s p h e r e 	 i s 	 _ _ _ _ .
A n s w e r : 	 	 4 	 : 	 3
T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s p h e r e : 	 T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 h e m i s p h e r e 	 = 	
= 	 4 	 : 	 3
6 . 	 T h e r e 	 a r e 	 6 0 	 b o y s 	 a n d 	 4 0 	 g i r l s 	 i n 	 a 	 c l a s s . 	 A 	 s t u d e n t 	 i s 	 s e l e c t e d 	 a t 	 r a n d o m . 	 F i n d 	 t h e
p r o b a b i l i t y 	 t h a t 	 s t u d e n t 	 i s 	 a 	 g i r l .
A n s w e r : 	
T o t a l 	 n o . 	 o f 	 s t u d e n t s 	 i n 	 t h e 	 c l a s s 	 = 	 1 0 0
N o . 	 o f 	 g i r l s 	 i n 	 t h e 	 c l a s s 	 = 	 4 0
P ( t h e 	 s t u d e n t 	 i s 	 a 	 g i r l ) 	 = 	
	 S e c t i o n 	 B
( Q u e s t i o n 	 n u m b e r s 	 7 	 t o 	 1 2 	 c a r r y 	 2 	 m a r k s 	 e a c h )
7 . 	 I f 	 p 	 = 	 2 - 	 a , 	 t h e n 	 p r o v e 	 t h a t 	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
A n s w e r : 	 S i n c e 	 p 	 = 	 2 	 – a , 	 	 	 p 	 + 	 a 	 – 	 2 	 = 	 0
p
3
	 + a
3
	 + ( - 2 )
3
	 = 	 3 ( p ) ( a ) ( - 2 ) 	 	 [ S i n c e 	 i f 	 a 	 + 	 b 	 + 	 c 	 = 	 0 , 	 t h e n 	 a
3
	 + 	 b
3
	 + 	 c
3
	 = 	 3 	 a b c ]
	 p
3
	 + a
3
	 – 	 8 	 = 	 - 6 a p
	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
8 . 	 I n 	 t h e 	 a d j o i n i n g 	 f i g u r e , 	 w e 	 h a v e 	 A B 	 = 	 B C , 	 B X 	 = 	 B Y . 	 S h o w 	 t h a t 	 A X 	 = 	 C Y 	 ( u s i n g
a p p r o p r i a t e 	 E u c l i d ’ s 	 a x i o m )
A n s w e r : 	 W e 	 h a v e
Page 3


7 	 / 	 2 8
C B S E 	 C l a s s 	 9 	 M a t h e m a t i c s
S a m p l e 	 P a p e r 	
S o l u t i o n
S e c t i o n - A
( Q u e s t i o n 	 n u m b e r s 	 1 	 t o 	 6 	 c a r r y 	 1 	 m a r k 	 e a c h )
1 . 	 I f 	 x
a / b
= 1 , 	 t h e n 	 f i n d 	 t h e 	 v a l u e 	 o f 	 ‘ a ’ .
A n s w e r : 	 a 	 = 	 0
S i n c e 	 a / b 	 = 0 	 , 	 t h e n 	 x
0
= 1
2 . 	 I f 	 p ( x ) 	 = 	 2 x
3
	 + 	 5 x
2
	 – 	 3 x 	 - 2 	 i s 	 d i v i d e d 	 b y 	 x - 1 , 	 t h e n 	 f i n d 	 t h e 	 r e m a i n d e r .
A n s w e r : 	 2
p ( 1 ) 	 i s 	 t h e 	 r e m a i n d e r .
p ( 1 ) 	 = 	 2 ( 1 )
3
	 + 	 5 ( 1 )
2
	 – 	 3 ( 1 ) 	 - 2 	 = 	 2 	 + 	 5 	 - 3 	 - 2 	 = 	 2
3 . 	 T h e 	 d i s t a n c e 	 o f 	 t h e 	 p o i n t 	 ( 0 , 	 - 1 ) 	 f r o m 	 t h e 	 o r i g i n 	 i s 	 _ _ _ _ _ _ _ _ . 	
A n s w e r : 	 1
d 	 = 	
= 	
= 	 	 1
4 . 	 I f 	 t h e 	 v e r t i c a l 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 i s 	 1 0 0
0
, 	 t h e n 	 f i n d 	 t h e 	 m e a s u r e s 	 o f 	 i t s
b a s e 	 a n g l e s .
A n s w e r : 	 4 0
°
	 , 	 4 0
°
L e t 	 m e a s u r e 	 o f 	 e a c h 	 b a s e 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 b e 	 x .
T h e r e f o r e , 	 w e 	 h a v e
1 0 0
°
	 + 	 x 	 + 	 x 	 = 	 1 8 0
°
	 	 2 x 	 = 	 1 8 0
°
	 – 	 1 0 0
°
	 	 x 	 = 	 4 0
°
.
8 	 / 	 2 8
5 . 	 T h e 	 r a t i o 	 o f 	 t h e 	 w h o l e 	 s u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 s p h e r e 	 a n d 	 a 	 s o l i d 	 h e m i s p h e r e 	 i s 	 _ _ _ _ .
A n s w e r : 	 	 4 	 : 	 3
T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s p h e r e : 	 T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 h e m i s p h e r e 	 = 	
= 	 4 	 : 	 3
6 . 	 T h e r e 	 a r e 	 6 0 	 b o y s 	 a n d 	 4 0 	 g i r l s 	 i n 	 a 	 c l a s s . 	 A 	 s t u d e n t 	 i s 	 s e l e c t e d 	 a t 	 r a n d o m . 	 F i n d 	 t h e
p r o b a b i l i t y 	 t h a t 	 s t u d e n t 	 i s 	 a 	 g i r l .
A n s w e r : 	
T o t a l 	 n o . 	 o f 	 s t u d e n t s 	 i n 	 t h e 	 c l a s s 	 = 	 1 0 0
N o . 	 o f 	 g i r l s 	 i n 	 t h e 	 c l a s s 	 = 	 4 0
P ( t h e 	 s t u d e n t 	 i s 	 a 	 g i r l ) 	 = 	
	 S e c t i o n 	 B
( Q u e s t i o n 	 n u m b e r s 	 7 	 t o 	 1 2 	 c a r r y 	 2 	 m a r k s 	 e a c h )
7 . 	 I f 	 p 	 = 	 2 - 	 a , 	 t h e n 	 p r o v e 	 t h a t 	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
A n s w e r : 	 S i n c e 	 p 	 = 	 2 	 – a , 	 	 	 p 	 + 	 a 	 – 	 2 	 = 	 0
p
3
	 + a
3
	 + ( - 2 )
3
	 = 	 3 ( p ) ( a ) ( - 2 ) 	 	 [ S i n c e 	 i f 	 a 	 + 	 b 	 + 	 c 	 = 	 0 , 	 t h e n 	 a
3
	 + 	 b
3
	 + 	 c
3
	 = 	 3 	 a b c ]
	 p
3
	 + a
3
	 – 	 8 	 = 	 - 6 a p
	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
8 . 	 I n 	 t h e 	 a d j o i n i n g 	 f i g u r e , 	 w e 	 h a v e 	 A B 	 = 	 B C , 	 B X 	 = 	 B Y . 	 S h o w 	 t h a t 	 A X 	 = 	 C Y 	 ( u s i n g
a p p r o p r i a t e 	 E u c l i d ’ s 	 a x i o m )
A n s w e r : 	 W e 	 h a v e
9 	 / 	 2 8
A B 	 = 	 B C 	 - - - - - - - - - - ( 1 )
B X 	 = 	 B Y - - - - - - - - - - - ( 2 )
S u b t r a c t 	 ( 2 ) 	 	 f r o m 	 ( 1 )
	 A B 	 – 	 B X 	 = 	 B C 	 – 	 B Y
N o w , 	 b y 	 E u c l i d ’ s 	 a x i o m 	 3 , 	 w e 	 h a v e
I f 	 e q u a l s 	 a r e 	 s u b t r a c t e d 	 f r o m 	 e q u a l s , 	 t h e 	 r e m a i n d e r s 	 a r e 	 e q u a l .
H e n c e 	 , 	 A X 	 = 	 C Y 	 ( 	 S i n c e 	 B X 	 = 	 B Y )
9 . 	 I f 	 t w o 	 o p p o s i t e 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 ( 6 3 	 - 3 x ) ° 	 a n d 	 ( 4 x 	 - 7 ) ° . 	 F i n d 	 a l l 	 t h e 	 a n g l e s
o f 	 t h e 	 p a r a l l e l o g r a m .
A n s w e r : 	 I n 	 a 	 p a r a l l e l o g r a m , 	 t h e 	 o p p o s i t e 	 a n g l e s 	 a r e 	 e q u a l .
( 6 3 	 - 3 x ) ° 	 = 	 ( 4 x 	 - 7 ) °
	 4 x 	 + 	 3 x 	 = 	 6 3 	 + 7
	 7 x 	 = 	 7 0
	 x 	 = 	 1 0
( 6 3 	 - 3 x ) ° 	 = 	 3 3 °
( 4 x 	 - 7 ) ° 	 = 	 3 3 °
S u m 	 o f 	 a l l 	 i n t e r i o r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 = 	 3 6 0 °
S u m 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 3 6 0 ° 	 - 	 ( 3 3 ° 	 + 	 3 3 ° )
= 	 3 6 0 ° 	 	 - 	 6 6 ° 	 = 	 2 9 4 °
E a c h 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 	 = 	 1 4 7 °
H e n c e 	 t h e 	 f o u r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 3 3 ° , 	 1 4 7 ° , 	 3 3 ° , 	 	 1 4 7 °
1 0 . 	 T h r e e 	 S c h o o l s 	 s i t u a t e d 	 a t 	 P , 	 Q 	 a n d 	 R 	 i n 	 t h e 	 f i g u r e 	 a r e 	 e q u i d i s t a n t 	 f r o m 	 e a c h 	 o t h e r 	 a s
s h o w n 	 i n 	 t h e 	 f i g u r e . 	 F i n d 	 Q O R .
Page 4


7 	 / 	 2 8
C B S E 	 C l a s s 	 9 	 M a t h e m a t i c s
S a m p l e 	 P a p e r 	
S o l u t i o n
S e c t i o n - A
( Q u e s t i o n 	 n u m b e r s 	 1 	 t o 	 6 	 c a r r y 	 1 	 m a r k 	 e a c h )
1 . 	 I f 	 x
a / b
= 1 , 	 t h e n 	 f i n d 	 t h e 	 v a l u e 	 o f 	 ‘ a ’ .
A n s w e r : 	 a 	 = 	 0
S i n c e 	 a / b 	 = 0 	 , 	 t h e n 	 x
0
= 1
2 . 	 I f 	 p ( x ) 	 = 	 2 x
3
	 + 	 5 x
2
	 – 	 3 x 	 - 2 	 i s 	 d i v i d e d 	 b y 	 x - 1 , 	 t h e n 	 f i n d 	 t h e 	 r e m a i n d e r .
A n s w e r : 	 2
p ( 1 ) 	 i s 	 t h e 	 r e m a i n d e r .
p ( 1 ) 	 = 	 2 ( 1 )
3
	 + 	 5 ( 1 )
2
	 – 	 3 ( 1 ) 	 - 2 	 = 	 2 	 + 	 5 	 - 3 	 - 2 	 = 	 2
3 . 	 T h e 	 d i s t a n c e 	 o f 	 t h e 	 p o i n t 	 ( 0 , 	 - 1 ) 	 f r o m 	 t h e 	 o r i g i n 	 i s 	 _ _ _ _ _ _ _ _ . 	
A n s w e r : 	 1
d 	 = 	
= 	
= 	 	 1
4 . 	 I f 	 t h e 	 v e r t i c a l 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 i s 	 1 0 0
0
, 	 t h e n 	 f i n d 	 t h e 	 m e a s u r e s 	 o f 	 i t s
b a s e 	 a n g l e s .
A n s w e r : 	 4 0
°
	 , 	 4 0
°
L e t 	 m e a s u r e 	 o f 	 e a c h 	 b a s e 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 b e 	 x .
T h e r e f o r e , 	 w e 	 h a v e
1 0 0
°
	 + 	 x 	 + 	 x 	 = 	 1 8 0
°
	 	 2 x 	 = 	 1 8 0
°
	 – 	 1 0 0
°
	 	 x 	 = 	 4 0
°
.
8 	 / 	 2 8
5 . 	 T h e 	 r a t i o 	 o f 	 t h e 	 w h o l e 	 s u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 s p h e r e 	 a n d 	 a 	 s o l i d 	 h e m i s p h e r e 	 i s 	 _ _ _ _ .
A n s w e r : 	 	 4 	 : 	 3
T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s p h e r e : 	 T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 h e m i s p h e r e 	 = 	
= 	 4 	 : 	 3
6 . 	 T h e r e 	 a r e 	 6 0 	 b o y s 	 a n d 	 4 0 	 g i r l s 	 i n 	 a 	 c l a s s . 	 A 	 s t u d e n t 	 i s 	 s e l e c t e d 	 a t 	 r a n d o m . 	 F i n d 	 t h e
p r o b a b i l i t y 	 t h a t 	 s t u d e n t 	 i s 	 a 	 g i r l .
A n s w e r : 	
T o t a l 	 n o . 	 o f 	 s t u d e n t s 	 i n 	 t h e 	 c l a s s 	 = 	 1 0 0
N o . 	 o f 	 g i r l s 	 i n 	 t h e 	 c l a s s 	 = 	 4 0
P ( t h e 	 s t u d e n t 	 i s 	 a 	 g i r l ) 	 = 	
	 S e c t i o n 	 B
( Q u e s t i o n 	 n u m b e r s 	 7 	 t o 	 1 2 	 c a r r y 	 2 	 m a r k s 	 e a c h )
7 . 	 I f 	 p 	 = 	 2 - 	 a , 	 t h e n 	 p r o v e 	 t h a t 	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
A n s w e r : 	 S i n c e 	 p 	 = 	 2 	 – a , 	 	 	 p 	 + 	 a 	 – 	 2 	 = 	 0
p
3
	 + a
3
	 + ( - 2 )
3
	 = 	 3 ( p ) ( a ) ( - 2 ) 	 	 [ S i n c e 	 i f 	 a 	 + 	 b 	 + 	 c 	 = 	 0 , 	 t h e n 	 a
3
	 + 	 b
3
	 + 	 c
3
	 = 	 3 	 a b c ]
	 p
3
	 + a
3
	 – 	 8 	 = 	 - 6 a p
	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
8 . 	 I n 	 t h e 	 a d j o i n i n g 	 f i g u r e , 	 w e 	 h a v e 	 A B 	 = 	 B C , 	 B X 	 = 	 B Y . 	 S h o w 	 t h a t 	 A X 	 = 	 C Y 	 ( u s i n g
a p p r o p r i a t e 	 E u c l i d ’ s 	 a x i o m )
A n s w e r : 	 W e 	 h a v e
9 	 / 	 2 8
A B 	 = 	 B C 	 - - - - - - - - - - ( 1 )
B X 	 = 	 B Y - - - - - - - - - - - ( 2 )
S u b t r a c t 	 ( 2 ) 	 	 f r o m 	 ( 1 )
	 A B 	 – 	 B X 	 = 	 B C 	 – 	 B Y
N o w , 	 b y 	 E u c l i d ’ s 	 a x i o m 	 3 , 	 w e 	 h a v e
I f 	 e q u a l s 	 a r e 	 s u b t r a c t e d 	 f r o m 	 e q u a l s , 	 t h e 	 r e m a i n d e r s 	 a r e 	 e q u a l .
H e n c e 	 , 	 A X 	 = 	 C Y 	 ( 	 S i n c e 	 B X 	 = 	 B Y )
9 . 	 I f 	 t w o 	 o p p o s i t e 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 ( 6 3 	 - 3 x ) ° 	 a n d 	 ( 4 x 	 - 7 ) ° . 	 F i n d 	 a l l 	 t h e 	 a n g l e s
o f 	 t h e 	 p a r a l l e l o g r a m .
A n s w e r : 	 I n 	 a 	 p a r a l l e l o g r a m , 	 t h e 	 o p p o s i t e 	 a n g l e s 	 a r e 	 e q u a l .
( 6 3 	 - 3 x ) ° 	 = 	 ( 4 x 	 - 7 ) °
	 4 x 	 + 	 3 x 	 = 	 6 3 	 + 7
	 7 x 	 = 	 7 0
	 x 	 = 	 1 0
( 6 3 	 - 3 x ) ° 	 = 	 3 3 °
( 4 x 	 - 7 ) ° 	 = 	 3 3 °
S u m 	 o f 	 a l l 	 i n t e r i o r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 = 	 3 6 0 °
S u m 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 3 6 0 ° 	 - 	 ( 3 3 ° 	 + 	 3 3 ° )
= 	 3 6 0 ° 	 	 - 	 6 6 ° 	 = 	 2 9 4 °
E a c h 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 	 = 	 1 4 7 °
H e n c e 	 t h e 	 f o u r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 3 3 ° , 	 1 4 7 ° , 	 3 3 ° , 	 	 1 4 7 °
1 0 . 	 T h r e e 	 S c h o o l s 	 s i t u a t e d 	 a t 	 P , 	 Q 	 a n d 	 R 	 i n 	 t h e 	 f i g u r e 	 a r e 	 e q u i d i s t a n t 	 f r o m 	 e a c h 	 o t h e r 	 a s
s h o w n 	 i n 	 t h e 	 f i g u r e . 	 F i n d 	 Q O R .
1 0 	 /	 2 8
	 A n s w e r : 	 I n 	 	 P Q R , 	 w e 	 h a v e
	 P Q 	 = 	 Q R 	 = 	 P R 	 ( S i n c e 	 P , 	 Q 	 a n d 	 R 	 a r e 	 e q u i d i s t a n t )
	 S o , 	 	 P Q R 	 i s 	 a n 	 e q u i l a t e r a l 	 t r i a n g l e .
Q P R 	 = 	 6 0 °
S o , 	 Q O R 	 = 	 2 	 Q P R 	 = 	 2 ( 6 0 ° ) 	 = 	 1 2 0 ° 	 ( S i n c e 	 a n g l e 	 s u b t e n d e d 	 b y 	 a n 	 a r c 	 a t 	 t h e 	 c e n t r e 	 i s
d o u b l e 	 t h e 	 a n g l e 	 s u b t e n d e d 	 b y 	 i t 	 a t 	 a n y 	 p o i n t 	 o n 	 t h e 	 r e m a i n i n g 	 p a r t 	 o f 	 t h e 	 c i r c l e . )
1 1 . 	 T h e 	 d i a m e t e r 	 o f 	 t h e 	 t w o 	 r i g h t 	 c i r c u l a r 	 c o n e s 	 a r e 	 e q u a l 	 i f 	 t h e i r 	 s l a n t 	 h e i g h t s 	 a r e 	 i n
t h e 	 r a t i o 	 3 	 : 2 , 	 t h e n 	 w h a t 	 i s 	 t h e 	 r a t i o 	 o f 	 t h e i r 	 c u r v e d 	 s u r f a c e 	 a r e a s ?
A n s w e r : 	 L e t 	 t h e 	 r a d i i 	 a n d 	 s l a n t 	 h e i g h t s 	 o f 	 t w o 	 r i g h t 	 c i r c u l a r 	 c o n e s 	 a r e 	 r
1
, 	 l
1
	 a n d 	 r
2
, 	 l
2
r e s p e c t i v e l y .
	 R a t i o 	 o f 	 t h e i r 	 C u r v e d 	 S u r f a c e 	 A r e a 	 = 	 ( S i n c e 	 	 r
1
	 = 	 r
2
)
= 	 = 	 3 	 : 	 2
1 2 . 	 A 	 b a t s m a n 	 i n 	 h i s 	 1 1
t h
	 i n n i n g s 	 m a k e s 	 a 	 s c o r e 	 o f 	 6 8 	 r u n s 	 a n d 	 t h e r e 	 b y 	 i n c r e a s e s 	 h i s
a v e r a g e 	 s c o r e 	 b y 	 2 . 	 W h a t 	 i s 	 h i s 	 a v e r a g e 	 s c o r e 	 a f t e r 	 t h e 	 1 1
t h
	 i n n i n g s .
A n s w e r : 	 L e t 	 t h e 	 a v e r a g e 	 s c o r e 	 o f 	 1 1 	 i n n i n g s 	 b e 	 x :
T h e n 	 t h e 	 a v e r a g e 	 s c o r e 	 o f 	 1 0 	 i n n i n g s 	 = 	 x 	 – 	 2
	 T o t a l 	 s c o r e 	 o f 	 1 1 	 i n n i n g s 	 = 	 1 1 	 x
Page 5


7 	 / 	 2 8
C B S E 	 C l a s s 	 9 	 M a t h e m a t i c s
S a m p l e 	 P a p e r 	
S o l u t i o n
S e c t i o n - A
( Q u e s t i o n 	 n u m b e r s 	 1 	 t o 	 6 	 c a r r y 	 1 	 m a r k 	 e a c h )
1 . 	 I f 	 x
a / b
= 1 , 	 t h e n 	 f i n d 	 t h e 	 v a l u e 	 o f 	 ‘ a ’ .
A n s w e r : 	 a 	 = 	 0
S i n c e 	 a / b 	 = 0 	 , 	 t h e n 	 x
0
= 1
2 . 	 I f 	 p ( x ) 	 = 	 2 x
3
	 + 	 5 x
2
	 – 	 3 x 	 - 2 	 i s 	 d i v i d e d 	 b y 	 x - 1 , 	 t h e n 	 f i n d 	 t h e 	 r e m a i n d e r .
A n s w e r : 	 2
p ( 1 ) 	 i s 	 t h e 	 r e m a i n d e r .
p ( 1 ) 	 = 	 2 ( 1 )
3
	 + 	 5 ( 1 )
2
	 – 	 3 ( 1 ) 	 - 2 	 = 	 2 	 + 	 5 	 - 3 	 - 2 	 = 	 2
3 . 	 T h e 	 d i s t a n c e 	 o f 	 t h e 	 p o i n t 	 ( 0 , 	 - 1 ) 	 f r o m 	 t h e 	 o r i g i n 	 i s 	 _ _ _ _ _ _ _ _ . 	
A n s w e r : 	 1
d 	 = 	
= 	
= 	 	 1
4 . 	 I f 	 t h e 	 v e r t i c a l 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 i s 	 1 0 0
0
, 	 t h e n 	 f i n d 	 t h e 	 m e a s u r e s 	 o f 	 i t s
b a s e 	 a n g l e s .
A n s w e r : 	 4 0
°
	 , 	 4 0
°
L e t 	 m e a s u r e 	 o f 	 e a c h 	 b a s e 	 a n g l e 	 o f 	 a n 	 i s o s c e l e s 	 t r i a n g l e 	 b e 	 x .
T h e r e f o r e , 	 w e 	 h a v e
1 0 0
°
	 + 	 x 	 + 	 x 	 = 	 1 8 0
°
	 	 2 x 	 = 	 1 8 0
°
	 – 	 1 0 0
°
	 	 x 	 = 	 4 0
°
.
8 	 / 	 2 8
5 . 	 T h e 	 r a t i o 	 o f 	 t h e 	 w h o l e 	 s u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 s p h e r e 	 a n d 	 a 	 s o l i d 	 h e m i s p h e r e 	 i s 	 _ _ _ _ .
A n s w e r : 	 	 4 	 : 	 3
T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s p h e r e : 	 T o t a l 	 S u r f a c e 	 a r e a 	 o f 	 a 	 s o l i d 	 h e m i s p h e r e 	 = 	
= 	 4 	 : 	 3
6 . 	 T h e r e 	 a r e 	 6 0 	 b o y s 	 a n d 	 4 0 	 g i r l s 	 i n 	 a 	 c l a s s . 	 A 	 s t u d e n t 	 i s 	 s e l e c t e d 	 a t 	 r a n d o m . 	 F i n d 	 t h e
p r o b a b i l i t y 	 t h a t 	 s t u d e n t 	 i s 	 a 	 g i r l .
A n s w e r : 	
T o t a l 	 n o . 	 o f 	 s t u d e n t s 	 i n 	 t h e 	 c l a s s 	 = 	 1 0 0
N o . 	 o f 	 g i r l s 	 i n 	 t h e 	 c l a s s 	 = 	 4 0
P ( t h e 	 s t u d e n t 	 i s 	 a 	 g i r l ) 	 = 	
	 S e c t i o n 	 B
( Q u e s t i o n 	 n u m b e r s 	 7 	 t o 	 1 2 	 c a r r y 	 2 	 m a r k s 	 e a c h )
7 . 	 I f 	 p 	 = 	 2 - 	 a , 	 t h e n 	 p r o v e 	 t h a t 	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
A n s w e r : 	 S i n c e 	 p 	 = 	 2 	 – a , 	 	 	 p 	 + 	 a 	 – 	 2 	 = 	 0
p
3
	 + a
3
	 + ( - 2 )
3
	 = 	 3 ( p ) ( a ) ( - 2 ) 	 	 [ S i n c e 	 i f 	 a 	 + 	 b 	 + 	 c 	 = 	 0 , 	 t h e n 	 a
3
	 + 	 b
3
	 + 	 c
3
	 = 	 3 	 a b c ]
	 p
3
	 + a
3
	 – 	 8 	 = 	 - 6 a p
	 a
3
	 + 	 6 	 a 	 p 	 + 	 p
3
	 – 	 8 	 = 	 0 .
8 . 	 I n 	 t h e 	 a d j o i n i n g 	 f i g u r e , 	 w e 	 h a v e 	 A B 	 = 	 B C , 	 B X 	 = 	 B Y . 	 S h o w 	 t h a t 	 A X 	 = 	 C Y 	 ( u s i n g
a p p r o p r i a t e 	 E u c l i d ’ s 	 a x i o m )
A n s w e r : 	 W e 	 h a v e
9 	 / 	 2 8
A B 	 = 	 B C 	 - - - - - - - - - - ( 1 )
B X 	 = 	 B Y - - - - - - - - - - - ( 2 )
S u b t r a c t 	 ( 2 ) 	 	 f r o m 	 ( 1 )
	 A B 	 – 	 B X 	 = 	 B C 	 – 	 B Y
N o w , 	 b y 	 E u c l i d ’ s 	 a x i o m 	 3 , 	 w e 	 h a v e
I f 	 e q u a l s 	 a r e 	 s u b t r a c t e d 	 f r o m 	 e q u a l s , 	 t h e 	 r e m a i n d e r s 	 a r e 	 e q u a l .
H e n c e 	 , 	 A X 	 = 	 C Y 	 ( 	 S i n c e 	 B X 	 = 	 B Y )
9 . 	 I f 	 t w o 	 o p p o s i t e 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 ( 6 3 	 - 3 x ) ° 	 a n d 	 ( 4 x 	 - 7 ) ° . 	 F i n d 	 a l l 	 t h e 	 a n g l e s
o f 	 t h e 	 p a r a l l e l o g r a m .
A n s w e r : 	 I n 	 a 	 p a r a l l e l o g r a m , 	 t h e 	 o p p o s i t e 	 a n g l e s 	 a r e 	 e q u a l .
( 6 3 	 - 3 x ) ° 	 = 	 ( 4 x 	 - 7 ) °
	 4 x 	 + 	 3 x 	 = 	 6 3 	 + 7
	 7 x 	 = 	 7 0
	 x 	 = 	 1 0
( 6 3 	 - 3 x ) ° 	 = 	 3 3 °
( 4 x 	 - 7 ) ° 	 = 	 3 3 °
S u m 	 o f 	 a l l 	 i n t e r i o r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 = 	 3 6 0 °
S u m 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 3 6 0 ° 	 - 	 ( 3 3 ° 	 + 	 3 3 ° )
= 	 3 6 0 ° 	 	 - 	 6 6 ° 	 = 	 2 9 4 °
E a c h 	 o f 	 t h e 	 o t h e r 	 t w o 	 o p p o s i t e 	 a n g l e s 	 = 	 	 = 	 1 4 7 °
H e n c e 	 t h e 	 f o u r 	 a n g l e s 	 o f 	 a 	 p a r a l l e l o g r a m 	 a r e 	 3 3 ° , 	 1 4 7 ° , 	 3 3 ° , 	 	 1 4 7 °
1 0 . 	 T h r e e 	 S c h o o l s 	 s i t u a t e d 	 a t 	 P , 	 Q 	 a n d 	 R 	 i n 	 t h e 	 f i g u r e 	 a r e 	 e q u i d i s t a n t 	 f r o m 	 e a c h 	 o t h e r 	 a s
s h o w n 	 i n 	 t h e 	 f i g u r e . 	 F i n d 	 Q O R .
1 0 	 /	 2 8
	 A n s w e r : 	 I n 	 	 P Q R , 	 w e 	 h a v e
	 P Q 	 = 	 Q R 	 = 	 P R 	 ( S i n c e 	 P , 	 Q 	 a n d 	 R 	 a r e 	 e q u i d i s t a n t )
	 S o , 	 	 P Q R 	 i s 	 a n 	 e q u i l a t e r a l 	 t r i a n g l e .
Q P R 	 = 	 6 0 °
S o , 	 Q O R 	 = 	 2 	 Q P R 	 = 	 2 ( 6 0 ° ) 	 = 	 1 2 0 ° 	 ( S i n c e 	 a n g l e 	 s u b t e n d e d 	 b y 	 a n 	 a r c 	 a t 	 t h e 	 c e n t r e 	 i s
d o u b l e 	 t h e 	 a n g l e 	 s u b t e n d e d 	 b y 	 i t 	 a t 	 a n y 	 p o i n t 	 o n 	 t h e 	 r e m a i n i n g 	 p a r t 	 o f 	 t h e 	 c i r c l e . )
1 1 . 	 T h e 	 d i a m e t e r 	 o f 	 t h e 	 t w o 	 r i g h t 	 c i r c u l a r 	 c o n e s 	 a r e 	 e q u a l 	 i f 	 t h e i r 	 s l a n t 	 h e i g h t s 	 a r e 	 i n
t h e 	 r a t i o 	 3 	 : 2 , 	 t h e n 	 w h a t 	 i s 	 t h e 	 r a t i o 	 o f 	 t h e i r 	 c u r v e d 	 s u r f a c e 	 a r e a s ?
A n s w e r : 	 L e t 	 t h e 	 r a d i i 	 a n d 	 s l a n t 	 h e i g h t s 	 o f 	 t w o 	 r i g h t 	 c i r c u l a r 	 c o n e s 	 a r e 	 r
1
, 	 l
1
	 a n d 	 r
2
, 	 l
2
r e s p e c t i v e l y .
	 R a t i o 	 o f 	 t h e i r 	 C u r v e d 	 S u r f a c e 	 A r e a 	 = 	 ( S i n c e 	 	 r
1
	 = 	 r
2
)
= 	 = 	 3 	 : 	 2
1 2 . 	 A 	 b a t s m a n 	 i n 	 h i s 	 1 1
t h
	 i n n i n g s 	 m a k e s 	 a 	 s c o r e 	 o f 	 6 8 	 r u n s 	 a n d 	 t h e r e 	 b y 	 i n c r e a s e s 	 h i s
a v e r a g e 	 s c o r e 	 b y 	 2 . 	 W h a t 	 i s 	 h i s 	 a v e r a g e 	 s c o r e 	 a f t e r 	 t h e 	 1 1
t h
	 i n n i n g s .
A n s w e r : 	 L e t 	 t h e 	 a v e r a g e 	 s c o r e 	 o f 	 1 1 	 i n n i n g s 	 b e 	 x :
T h e n 	 t h e 	 a v e r a g e 	 s c o r e 	 o f 	 1 0 	 i n n i n g s 	 = 	 x 	 – 	 2
	 T o t a l 	 s c o r e 	 o f 	 1 1 	 i n n i n g s 	 = 	 1 1 	 x
1 1 	 /	 2 8
	 T o t a l 	 s c o r e 	 o f 	 1 0 	 i n n i n g s 	 = 	 1 0 ( x 	 - 2 ) 	 = 	 1 0 	 x 	 – 	 2 0
	 S c o r e 	 o f 	 t h e 	 1 1
t h
	 i n n i n g s 	 = 	 T o t a l 	 s c o r e 	 o f 	 1 1 	 i n n i n g s 	 – 	 T o t a l 	 s c o r e 	 o f 	 1 0 	 i n n i n g s
= 	 1 1 	 x 	 – 	 ( 1 0 x 	 – 	 2 0 )
= 	 x 	 	 + 	 2 0
	 	 x 	 + 	 2 0 	 = 	 6 8 	 	 ( 	 G i v e n 	 )
	 	 x 	 = 	 4 8
H e n c e , 	 t h e 	 a v e r a g e 	 s c o r e 	 a f t e r 	 t h e 	 1 1
t h
	 i n n i n g s 	 i s 	 4 8 .
S e c t i o n 	 C
( Q u e s t i o n 	 n u m b e r s 	 1 3 	 t o 	 2 2 	 c a r r y 	 3 	 m a r k s 	 e a c h )
1 3 . 	 R e p r e s e n t 	 o n 	 t h e 	 n u m b e r 	 l i n e
A n s w e r : 	
C o n s t r u c t i o n :
1 . 	 T a k e 	 a 	 l i n e 	 s e g m e n t 	 A O 	 = 	 3 	 u n i t 	 o n 	 t h e 	 x 	 a x i s .
2 . 	 D r a w 	 a 	 p e r p e n d i c u l a r 	 o n 	 O 	 a n d 	 d r a w 	 a 	 l i n e 	 O C 	 = 	 1 	 u n i t
3 . 	 N o w 	 j o i n 	 A C .
4 . 	 T a k e 	 A 	 a s 	 c e n t r e 	 a n d 	 A C 	 a s 	 r a d i u s , 	 d r a w 	 a n 	 a r c 	 w h i c h 	 c u t s 	 t h e 	 x 	 a x i s 	 a t 	 E .
5 . 	 A E 	 r e p r e s e n t s 	 u n i t s
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FAQs on Class 9 Math: Sample Question Paper- 12 (With Solutions)

1. What is the format of the Class 9 Math Sample Question Paper-12?
Ans. The Class 9 Math Sample Question Paper-12 follows a specific format that includes a set of questions along with their solutions. This format helps students understand the types of questions they may encounter in their exams and provides them with solutions to check their answers.
2. How can the Class 9 Math Sample Question Paper-12 help students in their exam preparation?
Ans. The Class 9 Math Sample Question Paper-12 is a valuable resource for students preparing for their exams. By solving this question paper, students can familiarize themselves with the exam pattern, gain confidence in their problem-solving skills, and identify any gaps in their understanding of the subject. The provided solutions also help them understand the correct approach to solving different types of math problems.
3. Are the questions in the Class 9 Math Sample Question Paper-12 similar to those asked in the actual exam?
Ans. The questions in the Class 9 Math Sample Question Paper-12 are designed to simulate the level of difficulty and the types of questions that students can expect in their actual exam. While the exact questions may not appear in the exam, solving this sample paper will help students prepare effectively by covering various concepts and problem-solving techniques.
4. Can students rely solely on the provided solutions in the Class 9 Math Sample Question Paper-12 for exam preparation?
Ans. While the solutions provided in the Class 9 Math Sample Question Paper-12 are helpful for understanding the correct approach to solving the questions, it is essential for students to practice solving similar problems on their own. Relying solely on the provided solutions may hinder the development of problem-solving skills and limit their ability to tackle unfamiliar questions in the exam.
5. How can students make the most of the Class 9 Math Sample Question Paper-12 in their exam preparation?
Ans. To make the most of the Class 9 Math Sample Question Paper-12, students should attempt to solve the questions without referring to the solutions initially. Once they have completed the paper, they can compare their answers with the provided solutions and identify any mistakes or areas where they need improvement. They should also analyze the solutions to understand the logical steps and concepts used in solving each question. Regular practice of such sample papers can significantly enhance their exam preparation.
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