Mathematics, 24.03.2021 17:00 cristian592
Radioactive Decay Radium 226 is a radioactive substance with a decay constant .00043. Suppose that radium 226 is being continuously added to an initially empty container at a constant rate of 3 milligrams per year. Let P(t) denote the number of grams of radium 226 remaining in the container after t years. Find an initial-value problem satisfied by P(t). Solve the initial-value problem for P(t). What is the limit of the amount of radium 226 in the container as t tends to infinity?
Answers: 3
Another question on Mathematics
Mathematics, 21.06.2019 13:30
Akitchen floor is made up of tiles that are in the shape of the triangle shown there are 40 tiles on the kitchen floor what is the total area of the floor
Answers: 2
Mathematics, 21.06.2019 14:50
What is [tex] {7}^{98 + \sqrt{4} } - 3 \times (64 \div 2 + 4 - 36) \times a = a + 36[/tex]?
Answers: 3
Mathematics, 21.06.2019 18:10
Drag the tiles to the boxes to form correct pairs. not all tiles will be used. match each set of vertices with the type of quadrilateral they form.
Answers: 1
Mathematics, 21.06.2019 22:00
Jayne is studying urban planning and finds that her town is decreasing in population by 3% each year. the population of her town is changing by a constant rate.true or false?
Answers: 3
You know the right answer?
Radioactive Decay Radium 226 is a radioactive substance with a decay constant .00043. Suppose that r...
Questions
English, 28.10.2020 19:00
Mathematics, 28.10.2020 19:00
Mathematics, 28.10.2020 19:00
Business, 28.10.2020 19:00
Biology, 28.10.2020 19:00
Mathematics, 28.10.2020 19:00
Social Studies, 28.10.2020 19:00
