Inverse Proportion – Formula Practice

\( y=k/x. If y=18 when x=9, what is y when x=27? \)

Explanation

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Statement

Two quantities are said to be in inverse proportion (or inverse variation) if one increases while the other decreases in such a way that their product is constant. Mathematically:

\[ y \propto \tfrac{1}{x} \quad \Rightarrow \quad y = \tfrac{k}{x} \]

where \(k\) is the constant of proportionality.

Why it’s true

If doubling one quantity halves the other, the product remains unchanged.
For example, if speed increases, the time taken for a fixed journey decreases, but speed × time = distance stays constant.
This constant product is what defines an inverse proportion.

Recipe (how to use it)

Write the relationship as \(y = k/x\).
Find the constant \(k\) using known values of \(x\) and \(y\).
Use this \(k\) to find new values of \(y\) for given values of \(x\).
Always check: \(x \times y = k\) should hold.

Spotting it

Inverse proportion appears when a problem says “one value gets smaller as the other gets bigger” with their product constant — e.g., “5 workers finish in 12 days, 10 workers finish in 6 days.”

Common pairings

Speed, distance, and time problems.
Work problems (workers vs days).
Physics: pressure and volume (Boyle’s law).

Mini examples

Given: \(y\) varies inversely with \(x\). If \(y=8\) when \(x=3\), find \(y\) when \(x=12\). Solution: \(k=3×8=24\). For \(x=12\), \(y=24/12=2\).
Given: Time taken to complete a job varies inversely with the number of workers. If 4 workers take 15 days, how many days for 10 workers? Solution: \(k=4×15=60\). For 10 workers: time=60/10=6 days.

Pitfalls

Mixing up with direct proportion: Direct uses \(y=kx\); inverse uses \(y=k/x\).
Forgetting to keep product constant: Always calculate \(k=x×y\) first.
Zero values: \(x=0\) makes no sense here since division by zero is undefined.

Exam strategy

Step 1: Write down the product \(x×y=k\).
Step 2: Use the given pair to find \(k\).
Step 3: Apply it to find the missing value.
Check: does the product stay the same?

Summary

Inverse proportion means as one quantity increases, the other decreases, keeping the product constant. The formula is \(y=k/x\). It is used in real-life problems such as speed-time-distance and workers-days jobs.

Worked examples

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\( y varies inversely with x. If y=8 when x=3, find y when x=12. \)
1. \( k=x×y=3×8=24. \)
2. \( For x=12, y=k/x=24/12=2. \)
Answer: 2
\( If y varies inversely with x, and y=15 when x=2, find y when x=10. \)
1. \( k=2×15=30. \)
2. \( For x=10, y=30/10=3. \)
Answer: 3
\( y∝1/x. If x=5, y=20, find y when x=25. \)
1. \( k=5×20=100. \)
2. \( For x=25, y=100/25=4. \)
Answer: 4
Time to complete work varies inversely with workers. 4 workers take 15 days. How many days for 10 workers?
1. \( k=4×15=60. \)
2. \( For 10 workers, time=60/10=6 days. \)
Answer: 6
\( y=k/x. If y=12 when x=6, find y when x=18. \)
1. \( k=6×12=72. \)
2. \( For x=18, y=72/18=4. \)
Answer: 4
If speed and time are inversely proportional, a journey takes 12 hours at 40 km/h. How long at 60 km/h?
1. \( k=40×12=480. \)
2. \( For 60 km/h, time=480/60=8 hours. \)
Answer: 8 hours
\( Pressure and volume are inversely proportional. If P=100 at V=50, find P when V=200. \)
1. \( k=100×50=5000. \)
2. \( For V=200, P=5000/200=25. \)
Answer: 25
If 8 men take 30 days to build a wall, how many days for 20 men?
1. \( k=8×30=240. \)
2. \( For 20 men, days=240/20=12. \)
Answer: 12
\( y varies inversely with x. If y=5 when x=9, find y when x=15. \)
1. \( k=9×5=45. \)
2. \( For x=15, y=45/15=3. \)
Answer: 3
\( y∝1/x. If y=24 when x=2, find y when x=12. \)
1. \( k=2×24=48. \)
2. \( For x=12, y=48/12=4. \)
Answer: 4