SSC GD Constable Population Problems โ Study Material, 15 PYQs & Practice MCQs | ZestExam
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SSC GD Constable Population Problems
Study Material โ 15 PYQs (2020โ2020) ยท Concept Notes ยท Shortcuts
SSC GD Constable Population Problems is a frequently tested subtopic โ 15 previous year questions from 2020โ2020 papers are included below with concept notes, key rules and shortcut tricks.
The population of a city is 50,000. If it increases by 20% in the first year, what will be the population after one year?
Exam Q 42020Previous Year Pattern
A district's population is currently 2,00,000. If it grows at 8% per year, what will the population be after one year?
Exam Q 52020Previous Year Pattern
The population of a region decreased from 90,000 to 72,000. What is the percentage decrease?
Exam Q 62020Previous Year Pattern
A town's population was 80,000 last year. This year it decreased by 15%. What is the current population?
Exam Q 72020Previous Year Pattern
A village's population was 80,000 in 2019. The population increased by 15% in 2020 and by 25% in 2021. What was the percentage increase in population from 2019 to 2021?
Exam Q 82020Previous Year Pattern
The population of a region was 800,000 in 2015. By 2020, it had increased to 1,000,000. What was the percentage increase in population over this 5-year period?
Exam Q 92020Previous Year Pattern
In a district, the male population is 55% of the total population. If the total population is 500,000, and the male population increases by 10% while the female population decreases by 5%, what will be the new total population?
Exam Q 102020Previous Year Pattern
The population of town A is 240,000 and the population of town B is 360,000. If town A's population increases by 30% and town B's population decreases by 20%, what will be the ratio of their populations after these changes?
Exam Q 112020Previous Year Pattern
The population of a city was 500,000 in 2020. It increased by 20% in 2021 and then decreased by 10% in 2022. What is the population at the end of 2022?
Exam Q 122020Previous Year Pattern
A city's population increases by 25% every 5 years. If the population 10 years ago was 2,56,000, what is the population now?
Exam Q 132020Previous Year Pattern
The population of a city increases by 20% in the first year and then decreases by 10% in the second year. If the population after two years is 2,16,000, what was the original population?
Exam Q 142020Previous Year Pattern
A town's population grows at 15% per annum. If the population is currently 4,00,000, what will it be after 2 years? (Round to nearest integer if needed.)
Exam Q 152020Previous Year Pattern
In a city, the male population is 55% of the total. If the female population increases by 20% and the male population increases by 10%, the total population becomes 13,20,000. What was the original total population?
Concept Notes
Population Problemsโ Rules & Concept
๐ก
Core Concept
Read this first โ the foundation of the topic
โCORE CONCEPT
Population problems follow the compound growth formula. If a population increases or decreases by a certain percentage each year, you apply that percentage repeatedly, not just once. This is different from simple interest โ it's like compound interest
๐กKEY RULES
Population grows or shrinks by a fixed percentage each year
2. The percentage applies to the NEW population each year, not the original
3. Use the compound formula, not simple addition/subtraction
4. Decrease and increase work the same way mathematically
๐ข
Formula Block
Memorise โ at least one formula appears in every paper
Final Population = Initial Population ร (1 + r/100)^n
Where:
- r = rate of increase (use negative r for decrease)
- n = number of years
- If r = 5% increase, use (1 + 5/100) = 1.05
- If r = 10% decrease, use (1 - 10/100) = 0.90
๐
Exam Patterns
What examiners ask โ read before attempting PYQs
1
Find final population after n years
2
Find initial population (work backwards)
3
Find rate of growth
4
Find time period
5
Mixed increase and decrease over different years
โ๏ธ
Worked Example
Solve this step-by-step before moving on
1
Step 1
Population after Year 1
= 50,000 ร (1 + 10/100)
= 50,000 ร 1.10
= 55,000
2
Step 2
Population after Year 2
= 55,000 ร (1 + 20/100)
= 55,000 ร 1.20
= 66,000
Alternative Direct Method:
= 50,000 ร 1.10 ร 1.20
= 50,000 ร 1.32
= 66,000
COMMON MISTAKE:
Students add percentages directly: 10% + 20% = 30%, then calculate 50,000 ร 1.30 = 65,000. This is WRONG because the 20% applies to the increased population, not the original. Always multiply the factors for each year.
Key Points to Remember
Population problems use compound growth formula: Final = Initial ร (1 + r/100)^n
Percentage always applies to the CURRENT population, not the original amount
For decrease, use (1 - r/100) in the formula instead of (1 + r/100)
Multiple years with different rates: multiply all factors together for direct calculation
Never add percentages directly; always use multiplication of decimal factors
If asked for initial population, rearrange formula: Initial = Final รท (1 + r/100)^n
Exam-Specific Tips
Population formula: Final = Initial ร (1 + r/100)^n where r is annual rate and n is years
For 10% increase, multiply by 1.10; for 10% decrease, multiply by 0.90
If population increases by p% one year and q% next year, combined factor = (1 + p/100) ร (1 + q/100)
Compound population growth applies the percentage to the NEW amount each year, not original
For population decrease problems, the formula remains the same but r is treated as negative
Quick check: 50,000 population growing at 10% annually for 2 years = 50,000 ร 1.21 = 60,500
60-Second Revision โ Population Problems
Formula: Final Population = Initial ร (1 + r/100)^n โ this is compound, not simple
Trap: Never add percentages from different years. Multiply the growth factors instead
Decrease: Use negative r or write (1 - r/100) โ both methods give same answer
Multi-year: For different rates each year, write as Initial ร (1.10) ร (1.20) ร (0.95) etc.
Reverse: If given final population, divide backwards: Initial = Final รท [(1 + r/100)^n]
Quick mental check: 10% increase twice โ 21% total (not 20%), because second 10% acts on larger base