Mathematics - Linear Equations In One Variable
Exam Duration: 45 Mins Total Questions : 25
Solve for x: \({(3x+1)\over 16}+{(2x-3)\over 7}={(x+3)\over 8}+{(3x-1)\over 14}\)
- (a)
5
- (b)
10
- (c)
-14
- (d)
12
A number is 56 greater than the average of its third, quarter and one-twelfth. Find the number
- (a)
85
- (b)
64
- (c)
72
- (d)
40
If \({1\over 3}\) of a number is 10 less than the original number, then the number is ________.
- (a)
30
- (b)
15
- (c)
10
- (d)
27
Solve for x: 6(3x + 2) - 5(6x - 1) = 6(x - 3) - 5(7x- 6) + 12x
- (a)
-1
- (b)
1
- (c)
0
- (d)
2
The number 299 is divided into two parts in the ratio 5: 8. The product of the numbers is ______.
- (a)
21140
- (b)
21294
- (c)
21160
- (d)
31294
If \(({2\over 3})^{rd}\) of a number is 20 less than the original number, then the number is _________.
- (a)
60
- (b)
40
- (c)
80
- (d)
120
The perimeter of a rectangle is numerically equal to the area of rectangle. If width of rectangle is \(2{3\over 4}\) cm, then its length is _________.
- (a)
\({11\over 3}cm\)
- (b)
\({22\over 3}cm\)
- (c)
11 cm
- (d)
10 cm
A number whose seventh part exceeds its eighth part by 1, is ________.
- (a)
58
- (b)
56
- (c)
64
- (d)
68
A number consists of two digits whose sum is 9. If 27 is subtracted from the original number, its digits are interchanged. Then the original number is ________.
- (a)
53
- (b)
45
- (c)
92
- (d)
63
The denominator of a rational number is greater than its numerator by 3. If 3 is subtracted from the numerator and 2 is added to its denominator, then the new number becomes 1/5. The original rational number is ___________.
- (a)
\(-{5\over 8}\)
- (b)
\({5\over 8}\)
- (c)
\({3\over 8}\)
- (d)
\(-{3\over 8}\)
If \(x-(2x-{5x-1\over 3})={x-1\over 3}+{1\over 2}\) then, x is equal to ________.
- (a)
\({3\over 2}\)
- (b)
\({4\over 7}\)
- (c)
\({7\over 3}\)
- (d)
\({9\over 2}\)
A two digit number is less than 20. The sum of the digits is double that of their product. What is the number?
- (a)
12
- (b)
15
- (c)
13
- (d)
11
Find two parts of 34 such that \(({4\over 7})^{th}\) of one part is equal to \(({2\over 5})^{th}\) of the other.
- (a)
16, 18
- (b)
14, 20
- (c)
15, 19
- (d)
None of these
If the angles of a triangle are in the ratio 2: 3: 4, then the difference between the greatest and the smallest angle is _________.
- (a)
10°
- (b)
20°
- (c)
30°
- (d)
40°
One-sixth of a number, when subtracted from the number itself gives 25. The number is __________.
- (a)
30
- (b)
32
- (c)
35
- (d)
28
There were only two candidates in an election. One got 62% votes and was elected by a margin of 144 votes. The total number of voters were _________.
- (a)
500
- (b)
600
- (c)
700
- (d)
800
Sunita is twice as old as Ashima. If six years is subtracted from Ashima's age and four years added to Sunita's age, then Sunita will be four times that of Ashima's age. Find the sum of their ages two years ago.
- (a)
40 years
- (b)
42 years
- (c)
36 years
- (d)
38 years
At a party, colas, squash and fruit juice were offered to guests. One-fourth of the guests drank colas, One-third drank squash, two-fifths drank fruit juice and just three did not drink anything. How many guests were there in all?
- (a)
240
- (b)
180
- (c)
144
- (d)
190
Two years ago, Mohit was three times as old as his son and two years hence, twice of Mohit's age will be equal to five times that of his son. Then the present age of Mohit is ____.
- (a)
14 years
- (b)
38 years
- (c)
32 years
- (d)
34 years
A steamer goes downstream and covers the distance between two ports in 5 hours while it covers the same distance upstream in 6 hours. If the speed of the stream is 1 km/hr, find the speed of the steamer in still water.
- (a)
12 km/hr
- (b)
11 km/hr
- (c)
13 km/hr
- (d)
14 km/hr
Fill in the blanks.
(i) The solution of the equation ax + b = a is, ________
(ii) The shifting of a number from one side of an equation to other is ________
(iii) If a and b are positive integers then the solution of the equation ax = b has to be always ________
(iv) Linear equation in one variable has only one variable with power _________.
- (a)
(i) (ii) (iii) (iv) x = b/a commutativity positive 1 - (b)
(i) (ii) (iii) (iv) x = -b/a commutativity negative 2 - (c)
(i) (ii) (iii) (iv) x = b/a transposition negative 2 - (d)
(i) (ii) (iii) (iv) x = -b/a transposition positive 1
Which of the following statements is CORRECT?
Statement -1: \(x={1\over 2}\) is the solution of \(({2x-3\over 4})-({2x-1\over 2})={x-2\over 3}\)
Statement -2: \(x={63\over 2}\) is the solution of \({2x-17\over 2}-({x-{x-1\over 3}})=12.\)
- (a)
Only Statement - 1
- (b)
Only Statement - 2
- (c)
Both Statement - 1 and Statement - 2
- (d)
Neither Statement - 1 nor Statement - 2
State 'T' for true and 'F' for false.
I. An altitude of a triangle is five-third the length of its corresponding base. If the altitude be increased by 4 cm and the base be decreased by 2 cm, the area of the triangle would remain the same. The base and the altitude of the triangle respectively is 12 cm and 20 cm.
II. The perimeter of a rectangle is 140 cm. If the length of the rectangle is increased by 2 cm and its breadth decreased by 2 cm, the area of the rectangle is increased by 66 sq. cm. The length and breadth of the rectangle respectively is 35 cm and 30 cm.
III. The sum of two numbers is 2490. If 6.5% of one number is equal to 8.5% of the other number, then one of the numbers will be 1411.
- (a)
I II III F F F - (b)
I II III F T T - (c)
I II III T F F - (d)
I II III T F T
Which of the following statements is INCORRECT?
- (a)
Kusum buys some chocolates at the rate of Rs 10 per chocolate. She also buys an equal number of candies at the rate of Rs 5 per candy. She makes a 20% profit on chocolates and 8% profit on candies. At the end of the day, all chocolates and candies are sold out and her profit is Rs 240. Therefore, Kusum buys 100 chocolates.
- (b)
A carpenter charged Rs 2500 for making a bed. The cost of materials used is Rs 1100 and the labour charges are Rs 200/hr. So, the carpenter will work for 7 hours.
- (c)
On dividing Rs 200 between A and B such that twice of A's share is less than 3 times B's share by 200. So, B's share is Rs 120.
- (d)
Madhulika thought of a number, double it and added 20 to it. On dividing the resulting number by 25, she gets 4. Hence, the required number is 45.
Match the following:
Column-I | Column-II |
---|---|
P. If \({5m\over 6}+{3m\over 4}={19\over 12}\) then m = | (i) \({1\over 6}\) |
Q. If \(2x+{3\over 4}={x\over 2}+1\) then x = | (ii) 36 |
R. If \({z\over 2}-{3z\over 4}+{5z\over 6}=21\) then z = | (iii) \({27\over 10}\) |
S. If \({y\over 2}-{1\over 5}={y\over 3}+{1\over 4}\) then y = | (iv) 1 |
- (a)
P \(\rightarrow\) (iii); Q \(\rightarrow\) (iv); R \(\rightarrow\) (i); S \(\rightarrow\) (ii)
- (b)
P \(\rightarrow\) (iv); Q \(\rightarrow\) (ii); R \(\rightarrow\) (iii); S \(\rightarrow\) (i)
- (c)
P \(\rightarrow\) (ii); Q \(\rightarrow\) (i); R \(\rightarrow\) (iii); S \(\rightarrow\) (iv)
- (d)
P \(\rightarrow\) (iv); Q \(\rightarrow\) (i); R \(\rightarrow\) (ii); S \(\rightarrow\) (iii)