Robert makes 50 litres of green paint by mixing litres of yellow paint and litres of blue paint in the ratio 2:3 - Edexcel - GCSE Maths - Question 11 - 2018 - Paper 2

Next, we compute the costs associated with the paint:

• Yellow paint:

  • Tins required = ( \frac{20}{5} = 4 \text{ tins} )
  • Cost = ( 4 \text{ tins} \times £26 = £104 )

• Blue paint:

  • Tins required = ( \frac{30}{10} = 3 \text{ tins} )
  • Cost = ( 3 \text{ tins} \times £48 = £144 )

• Total cost of making 50 litres = £104 + £144 = £248.

Since Robert sells the green paint in 10-litre tins, we can now find the cost per tin:

• From 50 litres, he can make (\frac{50}{10} = 5) tins of green paint.
• Cost per tin = ( \frac{£248}{5} = £49.60 ).

To find profit per tin:

• Selling price per tin = £66.96
• Cost per tin = £49.60
• Profit per tin = Selling price - Cost = ( £66.96 - £49.60 = £17.36 ).

Now, to find the percentage profit:

• Percentage profit = ( \frac{\text{Profit}}{\text{Cost}} \times 100 )
• Plugging in the values: [ \text{Percentage profit} = \frac{£17.36}{£49.60} \times 100 \approx 35 % ]