Adventist International Mission
School
(English
Medium/Version) Since – 1996,
Second Term
Examination-2013
Standard V, Sub:
Elementary Mathematic,
Marks: 100 Times: 2
Hours Date: 6 October 2013, 2013
(Answer the question any ten include 1, 2, 3 and 13)
01. Multiple choice Question
i.
How many cubic centimeters are there in 7789
litres?
a.
7789 b. 778900 c. 7789000 d.7.789
ii.
1 metric ton =?
a.
100 quintal b. 100 kg c. 1000 kg d. 10 kg
iii.
Evaluate : 15% of 80 Km
a.
12 b. 12 Km c. 120Km d. 1.20
iv.
Percentage profit is calculated on the basis of the
__
a.
cost price b. sell price c. principal d. profit
v.
0.027 ÷ 18 =?
a.
0.015 b. 0.0015 c. 0.486 d. 01.12
vi.
1.8 x 0.18 x 0.8 x 0.01 =?
a.
0.002592 b. 0.02592 c. 2.59200 d. 25.0124
vii.
What is the G.C.D of 48, 72 and 168?
a.
20 b. 48 c. 24 d. 168
viii.
Convert this into improper fraction 40
a.
391 b. 125 c.
d. 
d.
ix.
Of is the tantamount of ______?
a.
Addition b. Subtraction c. Division
d. Multiplication
x.
Evaluate : 
a.
b. 
c. 
d. 
b. c. d.
02. Short
Question
i.
In a division problem dividend is 28087, the
divisor is 264 and the remainder is 103. What is the quotient?
ii.
Simplify: 78 – [56 + {165 – (48 ÷ 6 x 9) x 2}]
iii.
Write down the relation symbol with one example.
iv.
Fill in the gaps:
5
1
0
────────
4
5
9 0
0 0
5 7 0 0
─────────
3
6 1
5 0
v.
Find the product by Easy method: 5010 x 358
vi.
Divided 75850 by 37
vii.
Dividend
is 35792, divisor is 47 and remainder is 25. What is the quotient?
viii.
Find area of
the triangular region when base 44 m and height 40 m 40 cm
ix.
Divide: 82
kilometre 7 hectometre 6 decametre 4 metre by 9
x.
Express in Kilogram: 98 kilogram 76 gram 54 centigram 3 milligram
03. Creative: From a departmental store Zahidul Hasan bought 40 kg of rice,
Soyabean oil for 265 taka and fish for 588 taka. Each kg of rice costs 18 taka.
He gave 2000 taka to the cashier.
a.
How
much money he need of rice?
b. If one litre Soyabean cost is Tk. 53
then how many Soyabean oil for given Taka.
c. One dozen Hilsha fish is Tk. 4136 then
what the cost of 7 Hilsha fish is.
d. What amount will the cashier refund him?
e. If Mr. Zahidul Hasan spend for marketing
as 7 days he need how many money?
04. Proma, Rimi and Monisha made 70 flags to
decorate the school on Victory Day. It was found that Proma had made 5 more
flags than Rimi, again Monisha had 6 more flags than Proma. How many flags did
each one of them make?
05. In a test series of five cricket
matches, the average of the runs made by six batsmen of the visiting team was
76; the average of the runs made by four bowlers was 21. What average run did
those players make in that series?
06. Two drums have capacity 228 litres and
348 litres respectively. A bucket of what largest capacity can be used to fill
up the two drums with water using the bucket (to its) full capacity an integral
number of times? Which drum will hold how many buckets of water?
07. Mr. Matin bought a bicycle with 
portion of his
money. He then bought a radio at 
portion of the cost of the bicycle and
distributed the remaining money equally between his two daughters. Each
daughter got 300 taka. How much money did Mr. Matin have?
portion of his
money. He then bought a radio at portion of the cost of the bicycle and
distributed the remaining money equally between his two daughters. Each
daughter got 300 taka. How much money did Mr. Matin have?
08. 0 15 portion of a bamboo is in mud, 0 65
portion is in water. The length of the bamboo above water is 4 metre; what is
the length of the bamboo as a whole?
09. Interest for how many years on 300 taka
at 5% per annum will be 60 taka?
10. A drum can store 53 kg 9 hg 8 dg 7 gram
of flour. How much flour can be stored in 9 such drums.
11. The
measures of the base and height of a triangular land are 560 metre and 300
metre. Express its area in hectares.
12. In the annual examination Rony and Panna
respectively obtained 
and 
portion of the total marks. Rony obtained 50 marks more
than Panna. What were the total marks and
who obtained what marks?
and portion of the total marks. Rony obtained 50 marks more
than Panna. What were the total marks and
who obtained what marks?
13. a. Write down definition with
figure(Any two: 2 x 3 = 6)
i.
Parallelogram ii. Rectangle c. Square
b. Draw visually a parallelogram whose two adjacent sides have
lengths 4 cm and 3 cm. Measure the lengths of the opposite
sides, and each pair of opposite
angles. Draw the two diagonals of the
parallelogram and measure the lengths
of the four segments of the two
diagonals made by their point of
intersection.
Adventist International Mission
School
(English
Medium/Version) Since – 1996,
Second Term
Examination-2013
Standard V, Sub:
Elementary Mathematic,
Marks: 100 Times: 2
Hours Date: 6 October 2013, 2013
(Answer the question any ten include 1, 2, 3 and 13)
01. Multiple choice Question
i.
How many cubic centimeters are there in 7789
litres?
a.
7789 b. 778900 c. 7789000 d.7.789
ii.
1 metric ton =?
a.
100 quintal b. 100 kg c. 1000 kg d. 10 kg
iii.
Evaluate : 15% of 80 Km
a.
12 b. 12 Km c. 120Km d. 1.20
iv.
Percentage profit is calculated on the basis of the
__
a.
cost price b. sell price c. principal d. profit
v.
0.027 ÷ 18 =?
a.
0.015 b. 0.0015 c. 0.486 d. 01.12
vi.
1.8 x 0.18 x 0.8 x 0.01 =?
a.
0.002592 b. 0.02592 c. 2.59200 d. 25.0124
vii.
What is the G.C.D of 48, 72 and 168?
a.
20 b. 48 c. 24 d. 168
viii.
Convert this into improper fraction 40
a.
391 b. 125 c. d.
d.
ix.
Of is the tantamount of ______?
a.
Addition b. Subtraction c. Division
d. Multiplication
x.
Evaluate :
a.
b. c. d.
b. c. d.
02. Short
Question
i.
In a division problem dividend is 28087, the
divisor is 264 and the remainder is 103. What is the quotient?
ii.
Simplify: 78 – [56 + {165 – (48 ÷ 6 x 9) x 2}]
iii.
Write down the relation symbol with one example.
iv.
Fill in the gaps:
5
1
0
────────
4
5
9 0
0 0
5 7 0 0
─────────
3
6 1
5 0
v.
Find the product by Easy method: 5010 x 358
vi.
Divided 75850 by 37
vii.
Dividend
is 35792, divisor is 47 and remainder is 25. What is the quotient?
viii.
Find area of
the triangular region when base 44 m and height 40 m 40 cm
ix.
Divide: 82
kilometre 7 hectometre 6 decametre 4 metre by 9
x.
Express in Kilogram: 98 kilogram 76 gram 54 centigram 3 milligram
03. Creative: From a departmental store Zahidul Hasan bought 40 kg of rice,
Soyabean oil for 265 taka and fish for 588 taka. Each kg of rice costs 18 taka.
He gave 2000 taka to the cashier.
a.
How
much money he need of rice?
b. If one litre Soyabean cost is Tk. 53
then how many Soyabean oil for given Taka.
c. One dozen Hilsha fish is Tk. 4136 then
what the cost of 7 Hilsha fish is.
d. What amount will the cashier refund him?
e. If Mr. Zahidul Hasan spend for marketing
as 7 days he need how many money?
04. Proma, Rimi and Monisha made 70 flags to
decorate the school on Victory Day. It was found that Proma had made 5 more
flags than Rimi, again Monisha had 6 more flags than Proma. How many flags did
each one of them make?
05. In a test series of five cricket
matches, the average of the runs made by six batsmen of the visiting team was
76; the average of the runs made by four bowlers was 21. What average run did
those players make in that series?
06. Two drums have capacity 228 litres and
348 litres respectively. A bucket of what largest capacity can be used to fill
up the two drums with water using the bucket (to its) full capacity an integral
number of times? Which drum will hold how many buckets of water?
07. Mr. Matin bought a bicycle with portion of his
money. He then bought a radio at portion of the cost of the bicycle and
distributed the remaining money equally between his two daughters. Each
daughter got 300 taka. How much money did Mr. Matin have?
portion of his
money. He then bought a radio at portion of the cost of the bicycle and
distributed the remaining money equally between his two daughters. Each
daughter got 300 taka. How much money did Mr. Matin have?
08. 0 15 portion of a bamboo is in mud, 0 65
portion is in water. The length of the bamboo above water is 4 metre; what is
the length of the bamboo as a whole?
09. Interest for how many years on 300 taka
at 5% per annum will be 60 taka?
10. A drum can store 53 kg 9 hg 8 dg 7 gram
of flour. How much flour can be stored in 9 such drums.
11. The
measures of the base and height of a triangular land are 560 metre and 300
metre. Express its area in hectares.
12. In the annual examination Rony and Panna
respectively obtained and portion of the total marks. Rony obtained 50 marks more
than Panna. What were the total marks and
who obtained what marks?
and portion of the total marks. Rony obtained 50 marks more
than Panna. What were the total marks and
who obtained what marks?
13. a. Write down definition with
figure(Any two: 2 x 3 = 6)
i.
Parallelogram ii. Rectangle c. Square
b. Draw visually a parallelogram whose two adjacent sides have
lengths 4 cm and 3 cm. Measure the lengths of the opposite
sides, and each pair of opposite
angles. Draw the two diagonals of the
parallelogram and measure the lengths
of the four segments of the two
diagonals made by their point of
intersection.
D.
Statistics:10
(Any Two; 5
X2=10)
22. The marks obtained by 25 students in the annual examination
are given below
72, 85, 78,
84, 78, 75, 69, 67, 88, 80, 74, 77, 79, 69, 74, 73, 83, 65, 75, 69, 63, 75, 86, 66, 71.
a. Make the
frequency distribution table with 5 as class interval
and find the arithmetic mean from the table.
b. Show the
difference between the arithmetic means found in
two different ways.
23. Weekly savings (in taka) of 40 house wives are as follows:
155, 173, 166, 143, 168, 160, 156, 146, 162, 158, 159, 148, 150, 147, 132,156,
140, 155, 145, 135, 151141, 149, 169, 140, 125, 122, 140, 137, 175, 145, 150,
164, 142, 156, 152, 146, 148, 157, 167.
Find the arithmetic mean, median and mode
of weekly savings.
24. The favorite fruits of 200 students are given in the table.
Draw a pie-chart:
|
Fruit
|
Mango
|
Jackfruit
|
Lichi
|
Jambolic
|
|
Frequency
|
70
|
30
|
80
|
20
|
Adventist International Mission
School
(English Medium/Version) Since – 1996,
Model Test-2013
Standards VIII, Sub: Mathematics
Time: 3 Hours, Date: October 06, 2013 Marks:
100
A.
Arithmetic: 24
01. Is there any similarity in the following number-patterns?
Find the next number in :each of the following lists a 1, 1, 2, 3, 5, 8, 13
Any
Two (6 x 2 = 12)
02. The profit-principal for
a certain period of time is Tk. 5600 and the profit is of the principal. If the percentage of profit
is Tk. 8, find the time.
of the principal. If the percentage of profit
is Tk. 8, find the time.
03. How much money will become Tk. 10200 as profit-principal
in 4 years at the same rate of profit at which Tk. 6500 becomes Tk. 8840 as
profit-principal in 4 years?
04. . Present population of a city is 80 lac. If the growth
rate of population of that city is 30 per thousand, what will be the population
of the city after 3 years?
Any
One (6 x 1 = 6)
05. There are two crosswise roads of breadth 1.5 metres just
in the middle of a field of length 40 metres and breadth 30 metres. What is the
area of the two roads?
06. Around inside a rectangular garden of length 80 metres
and breadth 60 metres, there is a road of breadth 4 metres. How much money
would be spent to construct that road at Tk. 7.25 per square metre?
B.
Algebra: 30
Any
Two (6 x 2 = 12)
07. If m + = 2, prove that, m4 + = 2
= 2, prove that, m4 + = 2
08. Resolve into factors:a3 – 3a2b
+ 3ab2 -2b3
09. Find
the L.C.M of a3 + b3, (a + b)3, (a2
– b2)2 and (a2 – ab + b2)2
Mark (1 x 6
= 6)
10. Simplify:
Any One (6 X 1 = 6)
11. Solve
using the method of elimination
x
+ y = a – b
ax
– by = a2 + b2
12. If we add 7 with the numerator of a fraction, the fraction
will be 2 and if we subtract 2 from the denominator, the fraction will be 1.
Find the fraction.
Any One (6 X 1 = 6)
13. In a hostel, 65% of the students like fish, 55% of the
students like meat and 40% of the students like both.
a. Express the stated information by Venn diagram with short
explanation.
b. Find out the number of students who dislike both dishes.
14. Find out the set of the natural numbers by which if 171 and
396 are divided, in each case 21 remains as remainder.
C. Geometry:
36
Any
Two (6 x 2 = 12)
15. Chords equidistant from the centre of a
circle are equal.
16. If the square of a side of any triangle is
equal to the sum of the squares of other two sides, the angle between the
latter two sides is a right angle.
17. Two diagonals of a rhombus bisect each other
at right angles.
Answer
Two (2 x 5 = 10)
18. To construct a quadrilateral
when two adjacent sides and triangles are given.
19. To construct a quadrilateral
when three sides and two diagonals are given.
Any One (6 x
1= 6)
20. Prove
that, the quadrilateral formed by joining the mid-points of adjacent sides of a
rectangle is a rhombus In ABC, D and E are respectively the
midpoints of AB and AC. Prove that region
ADE = ( ∆ region ABC).
( ∆ region ABC).
Mark (1 X 6= 6)
21. The lengths of two diagonals are given. Construct the
rhombus.
