Liquid is pouring into a large vertical circular cylinder at a constant rate of 1600 cm³/s and is leaking out of a hole in the base, at a rate proportional to the square root of the height of the liquid already in the cylinder. The area of the circular cross section of the cylinder is 4000 cm². (a) Show that at time t seconds, the height h cm of liquid in the cylinder satisfies the differential equation $$\frac{dh}{dt} = 0.4 - k \sqrt{h}$$, where k is a positive constant. When h = 25, water is leaking out of the hole at 400 cm³/s. (b) Show that k = 0.02. (c) Separate the variables of the differential equation $$\frac{dh}{dt} = 0.4 - 0.02 \sqrt{h}$$ to show that the time taken to fill the cylinder from empty to a height of 100 cm is given by $$ \int_{0}^{100} \frac{50}{20 - \sqrt{h}} dh.$$ Using the substitution h = (20 - x)², or otherwise, (d) find the exact value of $$ \int_{0}^{100} \frac{50}{20 - \sqrt{h}} dh.$$ (e) Hence find the time taken to fill the cylinder from empty to a height of 100 cm, giving your answer in minutes and seconds to the nearest second.

A-Level Edexcel Maths Pure General Binomial Expansion: Liquid is pouring into a large v

Liquid is pouring into a large vertical circular cylinder at a constant rate of 1600 cm³/s and is leaking out of a hole in the base, at a rate proportional to the square root of the height of the liquid already in the cylinder - Edexcel - A-Level Maths Pure - Question 2 - 2008 - Paper 8

Question 2

Liquid is pouring into a large vertical circular cylinder at a constant rate of 1600 cm³/s and is leaking out of a hole in the base, at a rate proportional to the sq... show full transcript

Worked Solution & Example Answer:Liquid is pouring into a large vertical circular cylinder at a constant rate of 1600 cm³/s and is leaking out of a hole in the base, at a rate proportional to the square root of the height of the liquid already in the cylinder - Edexcel - A-Level Maths Pure - Question 2 - 2008 - Paper 8

Step 1

Show that at time t seconds, the height h cm of liquid in the cylinder satisfies the differential equation

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Answer

To derive the differential equation, we consider the rate of change of height with respect to time. The volume of liquid in the cylinder is given by

$V = A \cdot h = 4000h.$

The rate of volume change due to pouring is given by 1600 cm³/s. The volume is also decreasing at a rate proportional to the square root of the height, which is expressed as k√h, where k is a positive constant. Hence, we have:

$\frac{dV}{dt} = 1600 - k\sqrt{h}.$ Substituting our expression for volume gives:

$4000 \frac{dh}{dt} = 1600 - k\sqrt{h}.$

Rearranging leads to:

$\frac{dh}{dt} = 0.4 - \frac{k}{4000} \sqrt{h}.$

This shows that the height h satisfies the required differential equation.

Step 2

Show that k = 0.02.

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Answer

At the point when h = 25, the rate at which water is leaking out is given as 400 cm³/s. We substitute h into the derived equation:

$\frac{dh}{dt} = 0.4 - k\sqrt{25} = 0.4 - 5k.$ Setting this equal to the leakage rate of -400, we have:

$400 = 0.4 - 5k.$

Solving for k gives:

$5k = 0.4 - 400 \Rightarrow k = \frac{0.4 - 400}{5} = 0.02.$ Thus, we have shown k = 0.02.

Step 3

Separate the variables of the differential equation

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Answer

Starting from the equation:

$\frac{dh}{dt} = 0.4 - 0.02\sqrt{h},$ we can rewrite it in the separable form:

$\frac{dh}{0.4 - 0.02\sqrt{h}} = dt.$

Integrating both sides will give the time taken to fill the cylinder.

Step 4

Find the exact value of \int_{0}^{100} \frac{50}{20 - \sqrt{h}} dh.

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Answer

Using the substitution ( h = (20 - x)^2 ), we find that:

When h = 0, x = 20.
When h = 100, x = 10.

Then, the integral transforms to:

$\int_{20}^{10} \frac{50}{20 - (20 - x)} (-2(20 - x))dx \text{ which simplifies to } \int_{10}^{20} \frac{100}{x} dx.$

Evaluating gives:

$= 100 \ln(x) |_{10}^{20} = 100(\ln(20) - \ln(10)) = 100 \ln(2) \text{ in exact form.}$

Step 5

Hence find the time taken to fill the cylinder from empty to a height of 100 cm.

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Answer

From the evaluated integral, we have:

$\text{Time} = 200 \ln(2) \text{ seconds.}$

Calculating yields approximately:

$\text{Time} \approx 386.2934611 \text{ seconds which is } 6 \text{ minutes and } 26 \text{ seconds.}$

Liquid is pouring into a large vertical circular cylinder at a constant rate of 1600 cm³/s and is leaking out of a hole in the base, at a rate proportional to the square root of the height of the liquid already in the cylinder - Edexcel - A-Level Maths Pure - Question 2 - 2008 - Paper 8

Show that at time t seconds, the height h cm of liquid in the cylinder satisfies the differential equation

Show that k = 0.02.

Separate the variables of the differential equation

Find the exact value of \int_{0}^{100} \frac{50}{20 - \sqrt{h}} dh.

Hence find the time taken to fill the cylinder from empty to a height of 100 cm.

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