Answer:
a. The curve [tex]P(t) = -\frac{6e^t}{5-6e^t}[/tex] passes through the point (0, 6)
b. No solution of the curve [tex]P(t)[/tex] passes through the point (0, 1)
Step-by-step explanation:
Consider the family of the solution of DE [tex]P' = P(1 - P)[/tex] is [tex]P = \frac{c_1e^t}{1 + c_1e^t}[/tex]
a. If any solution passes through the point (0, 6), then there is [tex]c_1[/tex] such that the point (0, 6) satisfies the solution [tex]P = \frac{c_1e^t}{1 + c_1e^t}[/tex]
Substitute [tex]t = 0, P = 6[/tex] in [tex]P = \frac{c_1e^t}{1 + c_1e^t}[/tex] and then solve the equation to obtain [tex]c_1[/tex]
[tex]P(t) = \frac{c_1e^t}{1 + c_1e^t}\\P(0) = \frac{c_1e^0}{1+c_1e^0}\\ 6 = \frac{c_1}{1 + c_1}\\ c_1 = -\frac{6}{5}[/tex]
Therefore, the curve [tex]P(t) = -\frac{6e^t}{5 - 6e^t}[/tex] passes through the point (0, 6)
b. If any solution passes through the point(0, 1), then there is [tex]c_1[/tex] such that the point (0, 1) satisfies the solution [tex]P = \frac{c_1e^t}{1+c_1e^t}[/tex]
[tex]P(t) = \frac{c_1e^t}{1 + c_1e^t}\\ P(0) = \frac{c_1e^0}{1 + c_1e^0}\\ 1 = \frac{c_1}{1+c_1} \\1 + c_1 = c_1[/tex]
this is not possible
Hence, there is no curve [tex]P(t)[/tex] that exists which passes through the point (0, 1)
