$$ \mathrm{KNO}_{3} $$ dissolves in methanol; the mass $$ x $$ grams dissolved at time $$ t $$ seconds satisfies the differential equation $$ \frac{d y}{d t}=-0.004 y^{2}+0.8 y \text {. } $$ (i) What is the maximum amount of salt that will ever dissolve? (ii) If $$ y(0)=50 g $$, how long will it take for an additionall $$ 50 g $$ to dissolve? (iii) Draw the phase line using the equilibrium point(s) and state if they are stable or unstable.

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To analyze the differential equation: $$ \frac{dy}{dt} = -0.004y^2 + 0.8y, $$ we'll focus on part **(iii)**, which involves drawing the phase line and determining the stability of the equilibrium points. ### **Finding Equilibrium Points** Equilibrium points occur where $$\frac{dy}{dt} = 0$$: $$ -0.004y^2 + 0.8y = 0. $$ Factor out $$y$$: $$ y(-0.004y + 0.8) = 0. $$ This gives two equilibrium points: 1. $$ y = 0 $$ grams 2. $$ y = \frac{0.8}{0.004} = 200 $$ grams ### **Determining Stability** To determine the stability of each equilibrium point, analyze the derivative of $$\frac{dy}{dt}$$ with respect to $$y$$: $$ \frac{d}{dy}\left(\frac{dy}{dt}\right) = \frac{d}{dy}(-0.004y^2 + 0.8y) = -0.008y + 0.8. $$ 1. **At $$ y = 0 $$:** $$ \frac{d}{dy}\left(\frac{dy}{dt}\right) \Big|_{y=0} = -0.008(0) + 0.8 = 0.8 > 0. $$ - **Interpretation:** Since the derivative is positive, any small perturbation away from $$ y = 0 $$ will cause $$ y $$ to increase. Therefore, $$ y = 0 $$ is an **unstable** equilibrium. 2. **At $$ y = 200 $$:** $$ \frac{d}{dy}\left(\frac{dy}{dt}\right) \Big|_{y=200} = -0.008(200) + 0.8 = -1.6 + 0.8 = -0.8 < 0. $$ - **Interpretation:** Since the derivative is negative, perturbations away from $$ y = 200 $$ will cause $$ y $$ to return to 200. Therefore, $$ y = 200 $$ is a **stable** equilibrium. ### **Phase Line Construction** Here's how the phase line looks based on the stability analysis: ``` y = 0 (Unstable) ←——————→ y = 200 (Stable) ``` - **For $$ y < 0 $$:** Not physically meaningful in this context, so we typically consider $$ y \geq 0 $$. - **For $$ 0 < y < 200 $$:** $$ \frac{dy}{dt} > 0 $$ (since $$ 0.8 - 0.004y > 0 $$), so $$ y $$ increases towards 200. - **For $$ y > 200 $$:** $$ \frac{dy}{dt} < 0 $$ (since $$ 0.8 - 0.004y < 0 $$), so $$ y $$ decreases towards 200. ### **Visual Representation** ``` <---|---------|---------> 0 200 (Unstable) (Stable) ``` - Arrows point **away** from $$ y = 0 $$ (indicating instability). - Arrows point **towards** $$ y = 200 $$ from both directions (indicating stability). ### **Conclusion** - **Equilibrium Points:** - $$ y = 0 $$ grams (unstable) - $$ y = 200 $$ grams (stable) - **Phase Line:** ``` y = 0 (Unstable) ←——————→ y = 200 (Stable) ``` **Answer Summary:** Problem (iii) Answer To draw the phase line, first find equilibria by setting dy/dt = –0.004 y² + 0.8 y = 0, yielding y = 0 and y = 200 grams. The phase line is ← 0 ——————→ 200 → where y = 0 is an unstable equilibrium and y = 200 is a stable equilibrium. **Phase Line and Equilibrium Stability** - **Equilibrium Points:** - $$ y = 0 $$ grams (unstable) - $$ y = 200 $$ grams (stable) - **Phase Line:** ``` y = 0 (Unstable) ←——————→ y = 200 (Stable) ``` **Summary:** The phase line shows that $$ y = 0 $$ grams is an unstable equilibrium, while $$ y = 200 $$ grams is a stable equilibrium.

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