Mathematics, 05.06.2020 16:58 kvekrcurf
g Since we know the number of zombies is growing proportionally to the number of zombies present, we can construct a differential equation which models the number of zombies P(t): dP dt = kP. Specify the initial condition(s) of the differential equation. 2. From Example 5 in section 1.1, we learn that the general solution of the above differential equation takes form P(t) = Cekt. Use the following Mathematica command to define a function: P[t ] = C Ć¢Ėā EĆā (k Ć¢Ėā t), and check the value of P(t) at t = 0, 1, 20 (days) by putting in P[0], P[1] and P[20]. 3. Verify P(t) we defined above is the general solution of the differential equation in Problem 1 by plugging P(t) into the differential equation: Simplify[P 0 [t] Ć¢Ėā k Ć¢Ėā P[t]]. The Simplify function asks Mathematica to simplify the expression. Based on the result of the command, do you think P(t) is the general solution? 4. Use Solve and the initial conditions to find the unknown consta
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Mathematics, 21.06.2019 16:30
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Mathematics, 21.06.2019 18:30
You love to play soccer! you make a shot at the net 8 times during a game! of those 8 attempts, you score twice. what percent of the time did you score?
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Mathematics, 21.06.2019 21:00
Sweet t saved 20 percent of the total cost of the green-eyed fleas new album let there be fleas on earth. if the regular price is $30 how much did sweet save
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g Since we know the number of zombies is growing proportionally to the number of zombies present, we...
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