Yeast cells can respire aerobically or anaerobically - AQA - A-Level Biology - Question 3 - 2018 - Paper 2

The coloured liquid moved to the right due to the production of gases, specifically carbon dioxide, as a result of aerobic respiration in the yeast. This gas production causes an increase in pressure within the closed system, pushing the liquid through the capillary tubing.

To calculate the volume of gas produced, we first convert the distance moved by the liquid into volume. The volume of the capillary tubing can be calculated using the formula for the area of a circle:

ext{Area} = rac{ ext{π} imes d^2}{4}

Where $d = 1 cm = 0.1 cm$. So,

ext{Area} = rac{3.14 imes (0.1)^2}{4} = 0.00785 ext{ cm}^2

The volume is then:

$ext{Volume} = ext{Area} imes ext{length} = 0.00785 imes 1.5 = 0.011775 ext{ cm}^3$

To find the volume per hour:

ext{Volume per hour} = rac{0.011775 ext{ cm}^3}{24 ext{ hours}} imes 60 ext{ minutes} = 0.0296 ext{ cm}^3 ext{ hour}^{-1}

Thus, the volume of gas produced is approximately 0.0296 cm³ hour⁻¹.

A log scale is used to record the number of cells because it allows for a more manageable representation of exponential growth. This scale compresses large ranges of data, making it easier to visualize and analyze rapid increases in population size. It also helps to illustrate trends more clearly when dealing with large numbers.

Many yeast cells die during the death phase due to the depletion of essential nutrients and the accumulation of toxic byproducts, such as ethanol and carbon dioxide, which can become harmful at high concentrations.

To find the predicted population after 10 hours, we apply the growth equation:

$X_t = X_0 e^{rt}$

Where:

• $X_0 = 2000$ (initial population)
• $r = 0.5$ (growth rate)
• $t = 10$ hours

Calculating: