The growth of Pseudomonas bacteria is modeled as a first-order process with k=0.

Question

The growth of Pseudomonas bacteria is modeled as a first-order process with k=0.035 min^-1 at 37 degrees Celsius. The initial Pseudomonas population density is 1.0 x 10^3 cells/L. Enter your answer in scientific notation. (A) what is the population density after 4.0 h? _______ x 10 ^____ cells/L (B) what is the time required for the population to go from 1.0 x 10^3 to 3.5 x 10^3 cells/L? ________ x 10^___ cells/L The growth of Pseudomonas bacteria is modeled as a first-order process with k=0.035 min^-1 at 37 degrees Celsius. The initial Pseudomonas population density is 1.0 x 10^3 cells/L. Enter your answer in scientific notation. (A) what is the population density after 4.0 h? _______ x 10 ^____ cells/L (B) what is the time required for the population to go from 1.0 x 10^3 to 3.5 x 10^3 cells/L? ________ x 10^___ cells/L (A) what is the population density after 4.0 h? _______ x 10 ^____ cells/L (B) what is the time required for the population to go from 1.0 x 10^3 to 3.5 x 10^3 cells/L? ________ x 10^___ cells/L

Explanation / Answer

For growth kinetic process the formula is given by,

K = -2.303/t*log(a/(a+x))

K = rate constant = 0.035 min^-1

a = initial population = 1*10^3 cell/L

a+x = final population of bacteria = ?

from the formula,

0.035 = -2.303/(4*60)*log(1*10^3/(a+x))

a+x = 4.4403 * 10^6 cell/L

From the formula,

0.035 = -2.303/t*log(1*10^3/(3.5*10^3))

t = 35.7997 min

t = 35.7997/60 = 0.5967 hr

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