Government Jobs MCQ & Objective Questions
Government jobs are highly sought after in India, making them a crucial topic for students preparing for various exams. Understanding the nuances of government job-related questions can significantly enhance your exam performance. Practicing MCQs and objective questions helps you grasp important concepts and improves your ability to tackle exam challenges effectively.
What You Will Practise Here
Types of Government Jobs and their eligibility criteria
Important Government Job exams and their syllabus
Key concepts related to recruitment processes
Commonly asked Government Jobs MCQ questions
Current affairs and their relevance to Government Jobs
Important Government Jobs objective questions with answers
Tips for effective exam preparation and time management
Exam Relevance
The topic of Government Jobs frequently appears in various examinations, including CBSE, State Boards, and competitive exams like NEET and JEE. Students can expect questions that assess their knowledge of job types, eligibility, and current affairs related to government recruitment. Common question patterns include multiple-choice questions that require a clear understanding of concepts and the ability to apply them in practical scenarios.
Common Mistakes Students Make
Overlooking the eligibility criteria for different Government Jobs
Confusing similar job roles and their responsibilities
Neglecting current affairs that impact Government Jobs
Misunderstanding the recruitment process and its stages
FAQs
Question: What are the most important Government Jobs MCQ questions to focus on?Answer: Focus on questions related to eligibility criteria, recruitment processes, and current affairs, as these are frequently tested.
Question: How can I improve my performance in Government Jobs objective questions?Answer: Regular practice of MCQs and understanding key concepts will enhance your performance significantly.
Start your journey towards acing your exams today! Solve practice MCQs on Government Jobs and test your understanding to boost your confidence and knowledge.
Q. A recipe requires 3 cups of flour for 12 cookies. How many cups are needed for 30 cookies?
A.
6 cups
B.
7.5 cups
C.
8 cups
D.
9 cups
Show solution
Solution
Cups needed = (3 cups / 12 cookies) × 30 cookies = 7.5 cups.
Correct Answer:
B
— 7.5 cups
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Q. A recipe requires 3 cups of flour for 12 cookies. How many cups are needed for 36 cookies?
A.
6 cups
B.
7 cups
C.
8 cups
D.
9 cups
Show solution
Solution
Flour needed = (3 cups / 12 cookies) × 36 cookies = 9 cups.
Correct Answer:
A
— 6 cups
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Q. A recipe requires 3 cups of flour to make 12 cookies. How many cups of flour are needed to make 30 cookies?
A.
5 cups
B.
6 cups
C.
7 cups
D.
8 cups
Show solution
Solution
If 3 cups make 12 cookies, then 1 cup makes 4 cookies. For 30 cookies, needed cups = 30 / 4 = 7.5 cups, which rounds to 6 cups for practical purposes.
Correct Answer:
B
— 6 cups
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Q. A recipe requires 4 cups of flour to make 8 cookies. How many cups of flour are needed to make 20 cookies?
A.
8 cups
B.
10 cups
C.
12 cups
D.
15 cups
Show solution
Solution
4 cups for 8 cookies means 1 cup for 2 cookies. For 20 cookies, 20/2 = 10 cups.
Correct Answer:
B
— 10 cups
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Q. A recipe requires sugar and flour in the ratio of 2:3. If there are 12 cups of sugar, how many cups of flour are needed?
Show solution
Solution
Let sugar = 2x and flour = 3x. Given 2x = 12, x = 6. Therefore, flour = 3x = 3*6 = 18.
Correct Answer:
A
— 18
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Q. A recipe requires sugar and flour in the ratio of 2:3. If you have 12 cups of flour, how much sugar do you need?
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Solution
Let sugar be 2x and flour be 3x. Given 3x = 12, x = 4. Therefore, sugar = 2x = 2*4 = 8.
Correct Answer:
A
— 8
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Q. A recipe requires sugar and flour in the ratio of 2:3. If you have 12 cups of sugar, how many cups of flour do you need?
Show solution
Solution
Let sugar = 2x and flour = 3x. Given 2x = 12, x = 6. Therefore, flour = 3x = 3*6 = 18.
Correct Answer:
A
— 18
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Q. A rectangle has a length of 10 m and a width of 5 m. What is its area?
A.
30 m²
B.
40 m²
C.
50 m²
D.
60 m²
Show solution
Solution
Area = Length × Width = 10 m × 5 m = 50 m².
Correct Answer:
C
— 50 m²
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Q. A researcher finds that a certain plant species grows at a rate of 5 cm per month. How tall will the plant be after 2 years?
A.
60 cm
B.
70 cm
C.
80 cm
D.
90 cm
Show solution
Solution
5 cm/month * 24 months = 120 cm tall.
Correct Answer:
C
— 80 cm
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Q. A researcher finds that a certain plant species has a growth rate of 5 cm per month. How tall will the plant be after 2 years if it starts at 10 cm?
A.
70 cm
B.
80 cm
C.
90 cm
D.
100 cm
Show solution
Solution
2 years = 24 months. Growth = 5 cm/month * 24 months = 120 cm. Total height = 10 cm + 120 cm = 130 cm.
Correct Answer:
C
— 90 cm
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Q. A retailer bought a watch for $80 and marked it up by 25%. What is the marked price?
A.
$90
B.
$100
C.
$110
D.
$120
Show solution
Solution
Marked Price = Cost Price + Markup = 80 + (25% of 80) = 80 + 20 = $100.
Correct Answer:
C
— $110
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Q. A retailer bought a watch for $80 and sold it for $100. What is the gain in dollars?
A.
$15
B.
$20
C.
$25
D.
$30
Show solution
Solution
Gain = Selling Price - Cost Price = 100 - 80 = 20.
Correct Answer:
B
— $20
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Q. A retailer bought a watch for $80 and sold it for $100. What is the gain in percentage?
A.
25%
B.
30%
C.
20%
D.
15%
Show solution
Solution
Gain = Selling Price - Cost Price = 100 - 80 = 20. Gain Percentage = (Gain/Cost Price) * 100 = (20/80) * 100 = 25%.
Correct Answer:
A
— 25%
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Q. A retailer marks a product 40% above the cost price. If the cost price is $50, what is the marked price?
A.
$60
B.
$70
C.
$80
D.
$90
Show solution
Solution
Marked Price = Cost Price + 40% of Cost Price = 50 + 0.40 * 50 = 50 + 20 = 70.
Correct Answer:
C
— $80
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Q. A retailer marks up the price of a product by 25% and then offers a discount of 10%. If the cost price is $80, what is the final selling price?
A.
$90
B.
$92
C.
$95
D.
$100
Show solution
Solution
Marked Price = Cost Price + 25% of Cost Price = 80 + 20 = $100. Discount = 10% of 100 = $10. Selling Price = 100 - 10 = $90.
Correct Answer:
B
— $92
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Q. A retailer marks up the price of a watch by 25% and then offers a discount of 10%. If the cost price is $200, what is the final selling price?
A.
$220
B.
$225
C.
$230
D.
$240
Show solution
Solution
Marked Price = Cost Price + 25% of Cost Price = 200 + 50 = $250. Discount = 10% of 250 = 25. Selling Price = 250 - 25 = $225.
Correct Answer:
C
— $230
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Q. A retailer marks up the price of a watch by 25% and then offers a discount of 10%. If the cost price is $200, what is the selling price?
A.
$220
B.
$230
C.
$240
D.
$250
Show solution
Solution
Marked Price = Cost Price + 25% of Cost Price = 200 + 50 = 250. Discount = 10% of 250 = 25. Selling Price = Marked Price - Discount = 250 - 25 = 225.
Correct Answer:
C
— $240
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Q. A retailer offers a discount of 15% on a jacket priced at $200. What is the selling price after the discount?
A.
$170
B.
$180
C.
$190
D.
$160
Show solution
Solution
Discount = 15% of 200 = 0.15 * 200 = 30. Selling Price = 200 - 30 = 170.
Correct Answer:
B
— $180
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Q. A right triangle has an area of 30 square units and one leg measuring 10 units. What is the length of the other leg?
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Solution
Area = (1/2) * base * height, so 30 = (1/2) * 10 * height. Thus, height = 6.
Correct Answer:
B
— 6
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Q. A right triangle has an area of 30 square units and one leg measuring 5 units. What is the length of the other leg?
Show solution
Solution
Area = (1/2) * base * height, so 30 = (1/2) * 5 * height. Thus, height = 30 * 2 / 5 = 12.
Correct Answer:
B
— 10
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Q. A right triangle has one angle measuring 30 degrees. If the hypotenuse is 10, what is the length of the side opposite the 30-degree angle?
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Solution
The side opposite the 30-degree angle is half the hypotenuse: 10 * 1/2 = 5.
Correct Answer:
A
— 5
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Q. A right triangle has one leg measuring 9 and the hypotenuse measuring 15. What is the length of the other leg?
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Solution
Using the Pythagorean theorem, b = √(c² - a²) = √(15² - 9²) = √(225 - 81) = √144 = 12.
Correct Answer:
A
— 12
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Q. A right triangle has one leg of length 9 and a hypotenuse of length 15. What is the length of the other leg?
Show solution
Solution
Using the Pythagorean theorem, b = √(c² - a²) = √(15² - 9²) = √(225 - 81) = √144 = 12.
Correct Answer:
A
— 12
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Q. A river carries 500 cubic meters of water per second. How much water does it carry in an hour?
A.
1800000 cubic meters
B.
1500000 cubic meters
C.
1200000 cubic meters
D.
2000000 cubic meters
Show solution
Solution
500 m³/s * 3600 s = 1800000 cubic meters
Correct Answer:
A
— 1800000 cubic meters
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Q. A river flows at a speed of 2 m/s. How far will it flow in 3 hours?
A.
21600 m
B.
7200 m
C.
10800 m
D.
14400 m
Show solution
Solution
2 m/s * 3600 seconds/hour * 3 hours = 21600 m
Correct Answer:
A
— 21600 m
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Q. A river's pollution level is measured at 80 ppm (parts per million). If the river has 2000 liters of water, how many grams of pollutants are present?
A.
160 grams
B.
180 grams
C.
200 grams
D.
220 grams
Show solution
Solution
80 ppm means 80 mg/L. 2000 L * 80 mg/L = 160000 mg = 160 grams
Correct Answer:
A
— 160 grams
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Q. A runner completes a 400 m track in 50 seconds. What is their speed in m/s? (2023)
A.
6 m/s
B.
7 m/s
C.
8 m/s
D.
9 m/s
Show solution
Solution
Speed = Distance/Time = 400 m/50 s = 8 m/s
Correct Answer:
A
— 6 m/s
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Q. A salary is increased by 25%. If the original salary is $40,000, what is the new salary?
A.
$50,000
B.
$45,000
C.
$48,000
D.
$52,000
Show solution
Solution
New Salary = Original Salary + (25% of Original Salary) = 40000 + (0.25 * 40000) = 40000 + 10000 = $50,000.
Correct Answer:
B
— $45,000
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Q. A salary of $3000 is decreased by 10%. What is the new salary?
A.
$2700
B.
$2800
C.
$2900
D.
$3000
Show solution
Solution
New Salary = Original Salary - (10% of Original Salary) = 3000 - (0.1 * 3000) = 3000 - 300 = $2700.
Correct Answer:
A
— $2700
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Q. A school awards 10 students with a total of $2,000. If each student receives an equal amount, how much does each student get?
A.
$150
B.
$200
C.
$250
D.
$300
Show solution
Solution
$2,000 / 10 = $200.
Correct Answer:
B
— $200
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