A company predicts a yearly profit of £120 000 in the year 2013 - Edexcel - A-Level Maths Pure - Question 5 - 2013 - Paper 6

We need to find the smallest integer $n$ such that:

$120000 imes (1.05)^{(n-1)} > 200000$

Dividing both sides by 120000:

(1.05)^{(n-1)} > rac{200000}{120000} = rac{5}{3}

Taking the logarithm of both sides:

ext{log}_{10}((1.05)^{(n-1)}) > ext{log}_{10}igg(rac{5}{3}igg)

Using the property of logarithms:

(n-1) imes ext{log}_{10}(1.05) > ext{log}_{10}igg(rac{5}{3}igg)

Now substituting ext{log}_{10}(1.05) ext{ and } ext{log}_{10}igg(rac{5}{3}igg):

Let:

• $ext{log}_{10}(1.05) ext{ approximately equal to } 0.02119$
• ext{log}_{10}igg(rac{5}{3}igg) ext{ approximately equal to } 0.22185

Thus:

$(n - 1) imes 0.02119 > 0.22185$

Calculating for $n$: n - 1 > rac{0.22185}{0.02119} ext{ implying } n - 1 > 10.46 Thus, $n = 12$. The first year in which the yearly predicted profit exceeds £200,000 is 2024.

The total profit can be calculated using the formula for the sum of a geometric series:

S_n = a rac{(1 - r^n)}{1 - r}

Where:

• $a = 120000$ (the first term)
• $r = 1.05$ (the common ratio)
• $n = 11$ (the number of years from 2013 to 2023 inclusive)

Substituting into the formula:

S_{11} = 120000 rac{(1 - (1.05)^{11})}{1 - 1.05}

Calculating $(1.05)^{11}$: $(1.05)^{11} ext{ approximately equals to } 1.7137$

Therefore:

S_{11} = 120000 rac{(1 - 1.7137)}{-0.05}

Calculating this yields: S_{11} = 120000 rac{-0.7137}{-0.05} = 120000 imes 14.274

Calculating the total predicted profit: $S_{11} = 1712484 = 1704814$

Thus, the total predicted profit for the years 2013 to 2023 is approximately £1704814.