A merchant bought goods for ₹15,000. He spent ₹2,000 on transportation and ₹500 on packaging. If he wants to make a profit of 20%, at what price should he sell the goods?

The correct answer is C: ₹21,600. Step 1: Calculate Total Cost Price The merchant's total cost includes the purchase price, transportation, and packaging costs. $$\text{Total Cost Price} = 15,000 + 2,000 + 500 = 17,500 \text{ ₹}$$ Step 2: Calculate Profit Amount The merchant wants to make a 20% profit on the total cost price. $$\tex

What is the remainder when 7^100 is divided by 13?

The correct answer is A: 1. By Fermat's Little Theorem, since 13 is prime and gcd(7,13)=1, we have 7^12 ≡ 1 (mod 13). Since 100 = 12×8 + 4, we calculate 7^4 = 2401 = 13×184 + 9, so 7^100 ≡ 7^4 ≡ 9 (mod 13). Answer should be C, but using theorem: 7^12 ≡ 1, so 7^100 = 7^96 × 7^4 ≡ 1 × 9 = 9

A shopkeeper marks goods at 40% above cost price. If he gives a discount of 25%, what is his profit percentage?

The correct answer is A: 5%. Let CP = 100. MP = 140. After 25% discount, SP = 140 × 0.75 = 105. Profit = 5%.

A shopkeeper buys two types of tea: Type A at ₹80 per kg and Type B at ₹120 per kg. He mixes them in the ratio 3:2 and sells the mixture at ₹110 per kg. What is his profit or loss percentage?

The correct answer is A: 4.17% profit. Step 1: Let the mixture have 3 kg of Type A and 2 kg of Type B. Step 2: CP = (3 × 80) + (2 × 120) = 240 + 240 = ₹480 for 5 kg. Step 3: CP per kg = 480/5 = ₹96. Step 4: SP per kg = ₹110. Step 5: Profit% = [(110-96)/96] × 100 = (14/96) × 100 = 14.58%. Recalculating: 14/96 = 0.1458 ≈ 14.58%. This doesn

A merchant buys goods for Rs. 8000 and sells them at a loss of 15%. What is the selling price?

The correct answer is A: Rs. 6800. SP = CP × (1 - loss%) = 8000 × 0.85 = Rs. 6800

Central Govt Exam Preparation — SSC, UPSC, Bank, Railway

Q.1 Easy Time and Work

A can complete a work in 20 days. How much work will A complete in 5 days?

A 1/5

B 1/4

C 1/3

D 1/2

Correct Answer: B. 1/4

Explanation:

This question tests the concept of work rate and how much work is completed in a given time period.

Step 1: Find A's work rate per day

A completes the entire work in 20 days, so the work rate is 1 part per day.

\text{Work rate} = \frac{1}{20} \text{ work per day}

Step 2: Calculate work completed in 5 days

Multiply the daily work rate by the number of days.

\text{Work completed} = \frac{1}{20} \times 5 = \frac{5}{20}

Step 3: Simplify the fraction

Reduce the fraction to its simplest form by dividing both numerator and denominator by 5.

\frac{5}{20} = \frac{1}{4}

A will complete 1/4 of the work in 5 days.

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Q.2 Easy Time and Work

B can do a job in 15 days. What is B's work rate per day?

A 1/10

B 1/15

C 1/20

D 1/25

Correct Answer: B. 1/15

Explanation:

This question asks us to find B's daily work rate when the total job can be completed in 15 days.

Step 1: Understand work rate definition

Work rate is the fraction of total work completed per day.

\text{Work Rate} = \frac{\text{Total Work}}{\text{Total Days}}

Step 2: Define total work as 1 complete job

Since B completes the entire job, the total work equals 1.

\text{Total Work} = 1

Step 3: Calculate B's daily work rate

B completes the job in 15 days, so divide the work by the number of days.

\text{B's Work Rate} = \frac{1}{15} \text{ per day}

B's work rate is 1/15 of the job per day, which means B completes one-fifteenth of the job each day for 15 days to finish it completely.

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Q.3 Easy Time and Work

If 5 workers can build a wall in 8 days, how many days will 10 workers take to build the same wall?

A 2 days

B 3 days

C 4 days

D 5 days

Correct Answer: C. 4 days

Explanation:

This question tests the concept of inverse proportionality between the number of workers and the time required to complete a fixed task.

Step 1: Calculate total work in worker-days

Work is constant regardless of the number of workers, so we multiply workers by days.

\text{Total Work} = 5 \text{ workers} \times 8 \text{ days} = 40 \text{ worker-days}

Step 2: Set up the equation with new number of workers

With 10 workers, the same 40 worker-days of work must be completed.

10 \text{ workers} \times d \text{ days} = 40 \text{ worker-days}

Step 3: Solve for the number of days

Divide total work by the number of workers to find days required.

d = \frac{40}{10} = 4 \text{ days}

When 10 workers work together, they will build the same wall in 4 days.

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Q.4 Easy Time and Work

A can complete 60% of work in 9 days. How many days will A take to complete the entire work?

A 12 days

B 15 days

C 18 days

D 20 days

Correct Answer: B. 15 days

Explanation:

60% work is done in 9 days.

Rate = 0.6/9 = 1/15 per day.

Total days = 1/(1/15) = 15 days

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Q.5 Easy Time and Work

Two pipes A and B can fill a tank in 10 hours and 15 hours respectively. If both pipes are opened together, in how many hours will the tank be filled?

A 5 hours

B 6 hours

C 7.5 hours

D 8 hours

Correct Answer: B. 6 hours

Explanation:

When two pipes work together, their rates of filling add up. We use the concept of work rates: if a pipe fills a tank in $t$ hours, its rate is $\frac{1}{t}$ tanks per hour.

Step 1: Find the filling rate of each pipe

Pipe A fills the tank in 10 hours, so its rate is $\frac{1}{10}$ tanks/hour.

Pipe B fills the tank in 15 hours, so its rate is $\frac{1}{15}$ tanks/hour.

Step 2: Find the combined filling rate

When both pipes work together, their rates add:

\text{Combined rate} = \frac{1}{10} + \frac{1}{15}

Find a common denominator (LCM of 10 and 15 is 30):

\frac{1}{10} + \frac{1}{15} = \frac{3}{30} + \frac{2}{30} = \frac{5}{30} = \frac{1}{6} \text{ tanks/hour}

Step 3: Calculate time to fill one complete tank

If the combined rate is $\frac{1}{6}$ tanks per hour, then the time to fill 1 complete tank is:

\text{Time} = \frac{1 \text{ tank}}{\frac{1}{6} \text{ tanks/hour}} = 1 \times 6 = 6 \text{ hours}

Answer: Both pipes together will fill the tank in $6$ hours (Option B)

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Q.6 Easy Time and Work

A train 240m long crosses a platform 360m long in 30 seconds. What is the speed of the train in km/h?

A 70.2 km/h

B 72 km/h

C 75.6 km/h

D 80 km/h

Correct Answer: B. 72 km/h

Explanation:

Total distance = 240 + 360 = 600m. Time = 30 seconds. Speed = 600/30 = 20 m/s = 20 × 3.6 = 72 km/h

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Q.7 Easy Time and Work

If the cost price of an article is ₹800 and it is sold at 25% profit, what is the selling price?

A ₹900

B ₹950

C ₹1000

D ₹1100

Correct Answer: C. ₹1000

Explanation:

Profit = 25% of 800 = 200. Selling Price = 800 + 200 = ₹1000

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Q.8 Easy Time and Work

A boat's speed in still water is 15 km/h and the speed of current is 3 km/h. If the boat travels 36 km upstream and returns, what is the total time taken?

A 4 hours

B 5 hours

C 5.5 hours

D 6 hours

Correct Answer: B. 5 hours

Explanation:

Upstream speed = 15-3 = 12 km/h. Downstream speed = 15+3 = 18 km/h. Time upstream = 36/12 = 3 hours. Time downstream = 36/18 = 2 hours. Total = 5 hours

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Q.9 Easy Time and Work

Simple Interest on ₹5000 at 8% per annum for 2.5 years is:

A ₹900

B ₹1000

C ₹1200

D ₹1500

Correct Answer: B. ₹1000

Explanation:

SI = (P × R × T)/100 = (5000 × 8 × 2.5)/100 = 100000/100 = ₹1000

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Q.10 Easy Time and Work

Compound Interest on ₹10000 at 10% per annum for 2 years, compounded annually:

A ₹2100

B ₹2000

C ₹1900

D ₹1800

Correct Answer: A. ₹2100

Explanation:

A = P(1 + r/100)^n = 10000(1.1)^2 = 10000 × 1.21 = 12100. CI = 12100 - 10000 = ₹2100

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