Answer:
Q(t) = 60/((5/7)t + 1)
Or
Q(t) = 60/(0.714t + 1)
Step-by-step explanation:
Let Q(t) be the amount of the first substance present at time t. Then:
dQ/dt = -k*Q²
where k is a positive consstant of proportionality.
This is a separable differential equation:
Separating it we have;
-dQ/Q² = k dt
Integrating both sides:
1/Q - 1/Qo = k*t .....1
where Qo = Q(0) is the amount of the first substance present at time t = 0
1/Q = k*t + 1/Qo
Q(t) = Qo/(Qo*k*t + 1) ..........2
Given that Qo = 60g, so:
Q(t) = (60)/((60)*k*t + 1)
And also at t = 1 hr, Q(1 hr) = 35, so from equation 1:
1/(35) - (1/60) = k*(1 hr)
k = 1/84
Therefore, the equation 2 becomes;
Q(t) = Qo/(Qo*k*t + 1) ..........2
Q(t) = 60/(60×1/84×t + 1)
Q(t) = 60/((5/7)t + 1)
Or
Q(t) = 60/(0.714t + 1)
