QUESTION IMAGE
Question
model 2 – comparing shapes
| side | 1 cm | 2 cm | 4 cm |
|---|---|---|---|
| volume | 1 cm³ | 8 cm³ | 64 cm³ |
| surface area - to - volume ratio | 96:64 = 1.5:1 |
| diameter | 1 cm | 2 cm | 4 cm |
|---|---|---|---|
| volume | 0.5 cm³ | 4.2 cm³ | 34 cm³ |
| surface area - to - volume ratio |
| diameter × height | 1 cm × 1 cm | 1 cm × 2 cm | 1 cm × 4 cm |
|---|---|---|---|
| volume | 0.8 cm³ | 0.6 cm³ | 3.1 cm³ |
| surface area - to - volume ratio |
Step1: Calculate cube ratios
Cube (1 cm side):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{6}{1} = 6:1$
Cube (2 cm side):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{24}{8} = 3:1$
Step2: Calculate sphere ratios
Sphere (1 cm diameter):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{3}{0.5} = 6:1$
Sphere (2 cm diameter):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{13}{4.2} \approx 3.1:1$
Sphere (4 cm diameter):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{50}{34} \approx 1.5:1$
Step3: Calculate cylinder ratios
Cylinder (1 cm × 1 cm):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{4.7}{0.8} \approx 5.9:1$
Cylinder (1 cm × 2 cm):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{7.9}{0.6} \approx 13.2:1$
Cylinder (1 cm × 4 cm):
Ratio = $\frac{\text{Surface Area}}{\text{Volume}} = \frac{14}{3.1} \approx 4.5:1$
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Completed Cube Table (Surface Area-to-Volume Ratio):
1 cm side: $6:1$
2 cm side: $3:1$
4 cm side: $1.5:1$
Completed Sphere Table (Surface Area-to-Volume Ratio):
1 cm diameter: $6:1$
2 cm diameter: $\approx 3.1:1$
4 cm diameter: $\approx 1.5:1$
Completed Cylinder Table (Surface Area-to-Volume Ratio):
1 cm × 1 cm: $\approx 5.9:1$
1 cm × 2 cm: $\approx 13.2:1$
1 cm × 4 cm: $\approx 4.5:1$