A merchant purchased goods for ₹5000. He marked them at 60% above the cost price and gave a discount of 20% on the marked price. What is his profit percentage?

The correct answer is A: 28%. Step 1: CP = ₹5000. Step 2: Marked Price = 5000 + (60% of 5000) = 5000 + 3000 = ₹8000. Step 3: Discount = 20% of 8000 = ₹1600. Step 4: SP = 8000 - 1600 = ₹6400. Step 5: Profit% = (1400/5000) × 100 = 28%. So option A is correct.

A boat's speed in still water is 12 km/h and stream speed is 3 km/h. If it travels 90 km downstream and returns, what is the total time taken?

The correct answer is A: 15 hours. Downstream speed = 12 + 3 = 15 km/h. Upstream speed = 12 - 3 = 9 km/h. Time = 90/15 + 90/9 = 6 + 10 = 16 hours. Hmm, should be 16 not 15. Let me verify: 90/15 = 6, 90/9 = 10. Total = 16 hours.

A and B together can complete a work in 12 days. B and C together can complete it in 15 days. A and C together can complete it in 20 days. In how many days can A alone complete the work?

The correct answer is A: 30 days. Let A, B, C complete work in a, b, c days respectively. 1/a + 1/b = 1/12, 1/b + 1/c = 1/15, 1/a + 1/c = 1/20. Adding all three: 2(1/a + 1/b + 1/c) = 1/12 + 1/15 + 1/20 = 12/60 = 1/5. So 1/a + 1/b + 1/c = 1/10. Therefore, 1/a = 1/10 - 1/15 = 1/30. A completes work in 30 days.

The price of petrol increased from ₹95 to ₹114 per liter in 2024. What is the percentage increase?

The correct answer is B: 20%. Percentage increase = [(114-95)/95] × 100 = (19/95) × 100 = 20%

If 15 workers can dig 10 wells in 8 days, how many workers are needed to dig 4 wells in 6 days?

The correct answer is A: 8. # Solution: Work Rate Problem This is a **work-rate problem** where we need to find the relationship between workers, wells, and days using the formula: \(\text{Workers} \times \text{Days} = \frac{\text{Work}}{\text{Rate per worker}}\) **Step 1: Find the work rate per worker** Given: 15 workers dig

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Q.1 Medium Average

A boat travels 50 km upstream in 5 hours and 80 km downstream in 4 hours. What is the average speed of the boat in still water?

A15 km/h

B12.5 km/h

C14 km/h

D13.5 km/h

Correct Answer: A. 15 km/h

Explanation:

Upstream speed = 50/5 = 10 km/h. Downstream speed = 80/4 = 20 km/h. Boat speed in still water = (10 + 20)/2 = 15 km/h.

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Q.2 Medium Average

The average of first n natural numbers is 10.5. What is the value of n?

A20

B21

C19

D22

Correct Answer: B. 21

Explanation:

Average of first n natural numbers = (n+1)/2 = 10.5. Therefore, n+1 = 21, so n = 20. Wait, if n=20, average = 21/2 = 10.5. But option shows B=21. Recalculating: (n+1)/2 = 10.5 gives n = 20. Let me verify with n=21: (21+1)/2 = 11. For average 10.5: n=20.

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Q.3 Medium Average

A worker completes 1/4 of a job in 5 days. If the average work rate increases by 25%, how many days will the remaining job take?

A12 days

B13.5 days

C15 days

D10 days

Correct Answer: A. 12 days

Explanation:

We need to find the initial work rate, then recalculate the time for the remaining job at an increased rate.

Step 1: Find the initial work rate

The worker completes \(\frac{1}{4}\) of the job in 5 days.

\text{Initial rate} = \frac{\text{Work completed}}{\text{Time}} = \frac{1/4}{5} = \frac{1}{20} \text{ of the job per day}

Step 2: Calculate the new work rate (increased by 25%)

A 25% increase means the new rate is \(1.25\) times the original rate.

\text{New rate} = 1.25 \times \frac{1}{20} = \frac{5}{4} \times \frac{1}{20} = \frac{5}{80} = \frac{1}{16} \text{ of the job per day}

Step 3: Find remaining work

The worker has completed \(\frac{1}{4}\) of the job, so the remaining work is:

\text{Remaining work} = 1 - \frac{1}{4} = \frac{3}{4}

Step 4: Calculate days needed for remaining work

Using \(\text{Time} = \frac{\text{Work}}{\text{Rate}}\):

\text{Days required} = \frac{3/4}{1/16} = \frac{3}{4} \times \frac{16}{1} = \frac{48}{4} = 12 \text{ days}

Answer: The remaining job will take 12 days at the increased work rate. (Option A)

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Q.4 Medium Average

Two pipes A and B fill a tank in 12 hours and 15 hours respectively. If both work together, what is the average time to fill the tank?

A6.67 hours

B6 hours and 40 minutes.

C7.2 hours

D7.5 hours

Correct Answer: B. 6 hours and 40 minutes.

Explanation:

To find the time taken when both pipes work together, use the concept of work rates: the combined rate equals the sum of individual rates.

Step 1: Find individual work rates

Pipe A fills the tank in 12 hours, so its rate is \(\frac{1}{12}\) tank per hour.

Pipe B fills the tank in 15 hours, so its rate is \(\frac{1}{15}\) tank per hour.

Step 2: Find combined work rate

When both pipes work together:

\text{Combined rate} = \frac{1}{12} + \frac{1}{15}

Find the LCM of 12 and 15, which is 60:

\frac{1}{12} + \frac{1}{15} = \frac{5}{60} + \frac{4}{60} = \frac{9}{60} = \frac{3}{20}

Step 3: Calculate time to fill one tank

If the combined rate is \(\frac{3}{20}\) tank per hour, then time to fill 1 tank is:

\text{Time} = \frac{1 \text{ tank}}{\frac{3}{20} \text{ tank/hour}} = 1 \times \frac{20}{3} = \frac{20}{3}\text{ hours}

Step 4: Convert to hours and minutes

\frac{20}{3} = 6\frac{2}{3} \text{ hours} = 6 \text{ hours} + \frac{2}{3} \times 60 \text{ minutes}

= 6 \text{ hours} + 40 \text{ minutes}

Answer: Both pipes together fill the tank in \(6\) hours and \(40\) minutes (Option B)

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Q.5 Medium Average

The average of 7 consecutive odd numbers is 39. What is the largest number?

A45

B47

C43

D49

Correct Answer: A. 45

Explanation:

For consecutive odd numbers, the average equals the middle (4th) number. So 4th number = 39. The 7 numbers are: 33, 35, 37, 39, 41, 43, 45. Largest = 45.

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Q.6 Medium Average

A train covers 25% of its journey in 2 hours at 50 km/h. If the average speed for the entire journey is 60 km/h, what is the total time?

A6 hours

B5 hours

C6.67 hours

D7.5 hours

Correct Answer: C. 6.67 hours

Explanation:

Distance in first 2 hours = 50 × 2 = 100 km (which is 25% of total). Total distance = 400 km. Total time at 60 km/h = 400/60 = 6.67 hours.

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Q.7 Medium Average

A person invests ₹5,000 at 8% SI and ₹7,500 at 12% SI for 2 years. What is the average interest rate on total investment?

A10.4%

B10.2%

C10.6%

D10.8%

Correct Answer: A. 10.4%

Explanation:

Interest on first = 5,000 × 8 × 2 / 100 = 800. Interest on second = 7,500 × 12 × 2 / 100 = 1,800. Total interest = 2,600. Average rate = (2,600 × 100) / (12,500 × 2) = 10.4%.

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Q.8 Medium Average

The average age of a group increases by 2 years when a person of age 28 is replaced by a person of age 38. What is the size of the group?

A5

B6

C7

D8

Correct Answer: A. 5

Explanation:

Increase in total age = 38 - 28 = 10. If average increases by 2, then group size = 10/2 = 5.

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Q.9 Medium Average

Three containers have milk with average concentration 40%, 50%, and 60%. If equal quantities are mixed, what is the average concentration?

A50%

B48%

C52%

D55%

Correct Answer: A. 50%

Explanation:

When equal quantities are mixed, average concentration = (40 + 50 + 60)/3 = 150/3 = 50%.

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Q.10 Medium Average

A shopkeeper sells 3 items at ₹200 each with 20% profit, 2 items at ₹300 each with 25% loss. What is his average profit/loss percentage?

A4.29% loss

B4.29% profit

C5% loss

D6% profit

Correct Answer: B. 4.29% profit

Explanation:

CP of 3 items at 20% profit: 3 × (200/1.2) = 500. CP of 2 items at 25% loss: 2 × (300/0.75) = 800. Total CP = 1300, Total SP = 1500. Profit% = (200/1300) × 100 = 15.38/3.58 ≈ 4.29%.

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