36. The population of a bacterial culture increases from one thousand to one billion in five hours. The doubling time of the culture (correct to 1 decimal place) is        min.

36. The population of a bacterial culture increases from one thousand to one billion in five hours. The doubling time of the culture (correct to 1 decimal place) is        min.

Bacterial Doubling Time Calculation: Step-by-Step Solution Using Binary Fission Formula

Introduction

Bacteria reproduce primarily through binary fission, a process in which one bacterial cell divides into two genetically identical daughter cells. Under ideal environmental conditions, this process occurs repeatedly, leading to exponential population growth. Because each division doubles the number of cells, bacterial populations increase according to a geometric progression rather than a linear pattern. This rapid multiplication is one of the fundamental concepts in microbiology and forms the basis for studying microbial growth kinetics.

The time required for a bacterial population to double in number is called the doubling time or generation time. This parameter is widely used in microbiology, biotechnology, industrial fermentation, environmental microbiology, and medical microbiology. Understanding how to calculate doubling time is essential for predicting microbial growth, designing fermentation processes, evaluating antimicrobial treatments, and solving competitive examination numericals.

Correct Answer

Correct Answer: 30.1 minutes

Detailed Explanation

During exponential growth, bacterial population follows the equation:

N = N0 × 2n

where:

  • N = Final population
  • N0 = Initial population
  • n = Number of generations

The number of generations is calculated using the logarithmic form of the equation:

n = log(N/N0) / log2

Step 1: Write the Given Values

Initial population:

N0 = 1,000 = 103

Final population:

N = 1,000,000,000 = 109

Total growth time:

t = 5 hours = 300 minutes

Step 2: Calculate the Number of Generations

N/N0 = 109 / 103 = 106

Therefore,

n = log(106) / log2

= 6 / 0.3010

= 19.93 generations

Step 3: Calculate the Doubling Time

Doubling time (generation time) is given by:

Generation Time = Total Time / Number of Generations

= 300 / 19.93

= 15.05 minutes

Rounded to one decimal place:

Generation Time = 15.1 minutes

Step-by-Step Calculation Summary

Parameter Value
Initial Population 1,000 cells
Final Population 1,000,000,000 cells
Total Time 300 minutes
Population Increase 106 fold
Number of Generations 19.93
Doubling Time 15.1 minutes

Formula Used

Formula Purpose
N = N0 × 2n Exponential bacterial growth
n = log(N/N0) / log2 Number of generations
Generation Time = Total Time / n Doubling time calculation

Biological Significance

The doubling time reflects the rate at which bacteria reproduce under optimal environmental conditions. Fast-growing bacteria such as Escherichia coli may have generation times close to 20 minutes, whereas many pathogenic bacteria grow much more slowly. Accurate estimation of doubling time is essential in industrial fermentation, antibiotic susceptibility testing, food microbiology, environmental biotechnology, and clinical microbiology. It also provides valuable insights into microbial physiology and growth dynamics.

Final Answer

Initial Population = 1,000 cells

Final Population = 1,000,000,000 cells

Total Time = 300 minutes

Number of Generations = 19.93

Doubling Time = 300 ÷ 19.93 = 15.1 minutes

Correct Answer: 15.1 minutes

Note: If an answer key lists 30.1 minutes, it is incorrect for the values given. The correct calculation yields approximately 15.1 minutes.

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