A vase with a circular cross-section is shown in Figure 2. Water is flowing into the vase. When the depth of the water is $h$ cm, the volume of water $V$ cm³ is given by $$V = 4 ext{π}(h(h + 4)), \, 0 \leq h \leq 25$$ Water flows into the vase at a constant rate of $80 \, \text{cm}^3\text{s}^{-1}$. Find the rate of change of the depth of the water, in cm/s, when $h = 6$.

A-Level Edexcel Maths Pure Integration: A vase with a circular cross-sec

A vase with a circular cross-section is shown in Figure 2 - Edexcel - A-Level Maths Pure - Question 6 - 2014 - Paper 7

Question 6

A vase with a circular cross-section is shown in Figure 2. Water is flowing into the vase. When the depth of the water is $h$ cm, the volume of water $V$ cm³ is giv... show full transcript

Worked Solution & Example Answer:A vase with a circular cross-section is shown in Figure 2 - Edexcel - A-Level Maths Pure - Question 6 - 2014 - Paper 7

Step 1

Differentiate $V$ with respect to $h$

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Answer

To find the rate of change of the depth of water, we start by differentiating the volume $V$ with respect to the depth $h$ :

$V = 4\pi(h(h + 4))$

Applying the product rule, we get:

$\frac{dV}{dh} = 4\pi\left(h \cdot \frac{d}{dh}(h + 4) + (h + 4) \cdot \frac{dh}{dh}\right) = 4\pi(h(1) + (h + 4)(1))$

Thus:
$\frac{dV}{dh} = 4\pi(2h + 4) = 8\pi(h + 2)$

Step 2

Apply the rate of water inflow

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Answer

We know that water flows into the vase at a rate of $\frac{dV}{dt} = 80 \, \text{cm}^3\text{s}^{-1}$ . Using the relationship between $V$ and $h$ , by the chain rule we have:

$\frac{dV}{dt} = \frac{dV}{dh} \cdot \frac{dh}{dt}$

Now substituting for $\frac{dV}{dh}$ :

$80 = 8\pi(h + 2) \cdot \frac{dh}{dt}$

Step 3

Substitute $h = 6$

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Answer

Substituting $h = 6$ into the equation gives:

$80 = 8\pi(6 + 2) \cdot \frac{dh}{dt}$

This simplifies to:

$80 = 8\pi(8) \cdot \frac{dh}{dt}$

Or:

$80 = 64\pi \cdot \frac{dh}{dt}$

Step 4

Solve for $\frac{dh}{dt}$

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Answer

Now, we isolate for $\frac{dh}{dt}$ :

$\frac{dh}{dt} = \frac{80}{64\pi} = \frac{5}{4\pi}$

To get a numerical approximation, we calculate:

$\frac{dh}{dt} \approx \frac{5}{4 \cdot 3.14} \approx 0.398 \, \text{cm/s}$

A vase with a circular cross-section is shown in Figure 2 - Edexcel - A-Level Maths Pure - Question 6 - 2014 - Paper 7

Worked Solution & Example Answer:A vase with a circular cross-section is shown in Figure 2 - Edexcel - A-Level Maths Pure - Question 6 - 2014 - Paper 7

Differentiate $V$ with respect to $h$

Apply the rate of water inflow

Substitute $h = 6$

Solve for $\frac{dh}{dt}$

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