Mathematics, 19.02.2021 16:30 saintsfan2004
The population of a certain species of insect is given by a differentiable function P, where P(t) is the number of insects in the population, in millions, at time t, where t is measured in days. When the environmental conditions are right, the population increases with resect to time at a rate that is directly proportional to the population. Starting August 15, the conditions were favorable and the. population began increasing. On August 20, five days later, there were an estimated 10 million insects and the population was increasing at a rate of 2 million insects per day.
Required:
What is the differential equation that models this situation?
Answers: 2
Mathematics, 22.06.2019 03:20
Indicate the equation of the given line in standard form. the line containing the longer diagonal of a quadrilateral whose vertices are a (2, 2), b(-2, -2), c(1, -1), and d(6, 4).
Answers: 2
Mathematics, 22.06.2019 08:00
Don't answer if you don't know steve completed 9 homework problems in class. the function p(m) relates the time (in minutes) steve spent on his homework at home to the total number of problems he completed. the input is the number of minutes worked. the output is the number of problems completed. a. m(p) = 54p-6 b. m(p) = 6p - 54 c. m(p) = 54p +6 d. m(p) = 6p +54
Answers: 1
Mathematics, 22.06.2019 09:30
Cooper is studying two fractions that are both less than 1. the first fraction has a denominator of 4 and rounds to 1. the second fraction has a denominator of 6 and the same numerator as the first fraction. is the second fraction closest to 1, 1/2, or 1? explain
Answers: 3
Mathematics, 22.06.2019 09:30
Suppose that lm=24. use the triangle proportionality theorem to find pm
Answers: 2
The population of a certain species of insect is given by a differentiable function P, where P(t) is...
Biology, 05.02.2021 21:00
Mathematics, 05.02.2021 21:00
Mathematics, 05.02.2021 21:00
Chemistry, 05.02.2021 21:00
Mathematics, 05.02.2021 21:00
Spanish, 05.02.2021 21:00
History, 05.02.2021 21:00
Mathematics, 05.02.2021 21:00
Mathematics, 05.02.2021 21:00