3.1 Simphiwe will pack 12 cylindrical candles in a box using a 4 by 3 arrangement - NSC Mathematical Literacy - Question 3 - 2021 - Paper 1

1. The calculation for the ribbon needed for one candle is as follows:

   $ext{Ribbon needed for one candle} = 2 imes 3,142 imes 5,2 + 3 = 35,6768 ext{ cm}$

2. We convert the total ribbon length into centimeters:

   $20 ext{ meters} = 2000 ext{ cm}$

3. To find the number of candles he can decorate, we divide the total ribbon by the ribbon length needed for one candle:

   $ext{Number of candles} = \frac{2000 ext{ cm}}{35,6768 ext{ cm}} \\approx 56. ea\text{ (rounded down)}$

So, Simphiwe can decorate 56 candles.

1. First, we calculate the volume of the cylindrical candle using the given formula:

   $ext{Volume} = 3,142 imes (5,2)^2 imes 11,4 \\approx 968,54 ext{ cm}^3$

2. The volume of wax remaining after making the horsehead is:

   $ext{Volume of horsehead} = 968,54 - \frac{1}{3} \times 968,54 = 645,69 ext{ cm}^3$

Thus, the volume of wax needed for one horsehead candle is approximately 645.69 cm³.