The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018. (a) Write down the population of the island in 2018. (b) Write down the percentage growth rate used in the formula. (c) (i) Work out the population predicted by the formula for the year 2030. (ii) Give one reason why the answer to (c)(i) may not be reliable.

GCSE OCR Maths Percentages: The formula $$P = 6800 \times 1

The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018 - OCR - GCSE Maths - Question 16 - 2021 - Paper 1

Question 16

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The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018. (a) Write down the population of the island in 2... show full transcript

Worked Solution & Example Answer:The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018 - OCR - GCSE Maths - Question 16 - 2021 - Paper 1

Step 1

Write down the population of the island in 2018.

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Answer

To find the population in 2018, we set $n = 0$ in the formula. Thus, the population is: $P = 6800 \times 1.045^0 = 6800 \times 1 = 6800.$

Therefore, the population of the island in 2018 is 6800.

Step 2

Write down the percentage growth rate used in the formula.

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Answer

The formula uses a growth factor of $1.045$ . To find the percentage growth rate, we take $1.045 - 1 = 0.045$ , which translates to a growth rate of 4.5%.

Step 3

Work out the population predicted by the formula for the year 2030.

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Answer

For the year 2030, $n = 12$ (as it is 12 years after 2018). Utilizing the given formula: $P = 6800 \times 1.045^{12}.$ Calculating this, $P \approx 6800 \times 1.601 = 10885.68.$

Thus, the predicted population for the year 2030 is approximately 10886.

Step 4

Give one reason why the answer to (c)(i) may not be reliable.

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Answer

The prediction may not be reliable because it assumes that the growth rate will remain constant over the years, which may not reflect real-world changes such as economic, environmental, or social factors affecting the population.

The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018 - OCR - GCSE Maths - Question 16 - 2021 - Paper 1

Worked Solution & Example Answer:The formula $$P = 6800 \times 1.045^n$$ is used to predict the population, $P$, of an island $n$ years after 2018 - OCR - GCSE Maths - Question 16 - 2021 - Paper 1

Write down the population of the island in 2018.

Write down the percentage growth rate used in the formula.

Work out the population predicted by the formula for the year 2030.

Give one reason why the answer to (c)(i) may not be reliable.

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