Final answer:
To solve the logistic equation with the given initial conditions, substitute the values into the equation and solve for the unknowns. The logistic equation with the given initial conditions is y = 12 / (1 - 2 * e^-t).
Step-by-step explanation:
To solve the logistic equation with the given initial conditions, we can use the formula:
y = c / (1 + a * e-b * t)
Substituting the initial conditions into the equation, we have:
y1(0) = c / (1 + a * e-b * 0) = 6
y2(0) = c / (1 + a * e-b * 0) = -3
Since e0 = 1, we get:
c = 6(1 + a) and c = -3(1 + a)
Solving these equations simultaneously, we find that a = -2 and c = 12.
Therefore, the logistic equation with the given initial conditions is:
y = 12 / (1 - 2 * e-t)