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
Mathematics, 21.06.2019 16:30
Which of these is and example of a literal equation? a) 6+30=6^2 b)3x-4y c)12=9+3x d)ax-by=k
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Mathematics, 21.06.2019 17:30
Jabari is power washing houses for a summer job. for every job, he charges an initial fee plus $30 for each hour of work. his total fee for a 4 -hour job, for instance, is $170 . jabari's total fee,f, for a single job is a function of the number,t, of hours it takes him to complete the job. write the function's formula.
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Mathematics, 21.06.2019 19:30
Factor the following expression. 27y3 β 343 a. (3y + 7)(9y2 + 2ly + 49) b. (3y β 7)(9y2 + 2ly + 49) c. (3y β 7)(932 β 217 + 49) d. (3y + 7)(92 β 2ly + 49)
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Radioactive Decay Radium 226 is a radioactive substance with a decay constant .00043. Suppose that r...
English, 27.05.2020 21:57
English, 27.05.2020 21:57
Mathematics, 27.05.2020 21:57
Mathematics, 27.05.2020 21:57
Mathematics, 27.05.2020 21:57
Mathematics, 27.05.2020 21:57