Chapter 2: Q27E (page 77)

Use the method discussed under “Bernoulli Equations” to solve problems 21-28
$\frac{dr}{dθ} = \frac{r^{2} + 2 rθ}{θ^{2}}$

Short Answer

Expert verified

Equation of the form of Bernoulli equation for the given equation is $r = \frac{θ^{2}}{C - θ}$ .

Step by step solution

General form of Bernoulli equation

Bernoulli’s equation

A first-order equation that can be written in the form $\frac{dy}{dx} + P (x) y = Q (x) y^{n}$ , where P(x) and Q(x) are continuous on an interval and is a real number, is called a Bernoulli equation.

Evaluate the given equation

Given, $\frac{dr}{d θ} = \frac{r^{2} + 2 r θ}{θ^{2}}$ .

Evaluate it.

$\begin{matrix} \frac{dr}{d θ} = \frac{r^{2} + 2 r θ}{θ^{2}} \\ = \frac{r^{2}}{θ^{2}} + \frac{2 r}{θ} \\ \frac{dr}{d θ} - \frac{2}{θ} r = r^{2} θ^{- 2} \end{matrix}$

Compare with the general form of the Bernoulli equation.

n = 2, $P (θ) = - \frac{2}{θ}$ , and $Q (θ) = θ^{2}$ .

Now, divide by , we get,

$r^{- 2} \frac{dr}{d θ} - \frac{2}{θ} r^{- 1} = θ^{- 2} \cdot \cdot \cdot \cdot \cdot \cdot (1)$

Substitute $v = r^{- 1}$ .

Differentiate with respect to $θ$ .

$\begin{matrix} \frac{dv}{d θ} = - r^{- 2} \frac{dr}{d θ} \\ - \frac{dv}{d θ} = r^{- 2} \frac{dr}{d θ} \end{matrix}$

Substitute it on equation (1)

$\begin{array}{l} - \frac{dv}{d θ} - \frac{2}{θ} v = θ^{- 2} \\ \frac{dv}{d θ} + \frac{2}{θ} v = - θ^{- 2} \cdot \cdot \cdot \cdot \cdot \cdot (2) \end{array}$

Integrate the equation

Now, integrate the first. Where $P (θ) = \frac{2}{θ}$ .

$\begin{matrix} \int P (θ) d θ = 2 \int \frac{1}{θ} d θ \\ = 2 \ln |θ| \end{matrix}$

Then,

$\begin{matrix} μ (θ) = e^{\int P (θ) d θ} \\ = e^{2 \ln |θ|} \\ = θ^{2} \end{matrix}$

Multiply $μ (θ)$ with equation (2).

$\begin{matrix} θ^{2} \frac{dv}{d θ} + \frac{2}{θ} θ^{2} v = - 1 \\ θ^{2} \frac{dv}{d θ} + 2 θ v = - 1 \\ \frac{d}{d θ} [θ^{2} v] = - 1 \end{matrix}$

Integrate both sides,

$\begin{matrix} \int \frac{d}{d θ} [θ^{2} v] d θ = \int - 1 d θ \\ θ^{2} v = - θ + C_{1} \\ v = \frac{C - θ}{θ^{2}} \end{matrix}$

Substitution method

Substitute $v = r^{- 1}$ .

$\begin{matrix} r^{- 1} = \frac{C - θ}{θ^{2}} \\ r = \frac{θ^{2}}{C - θ} \end{matrix}$

Hence the solution is $r = \frac{θ^{2}}{C - θ}$

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Use the method discussed under “Bernoulli Equations” to solve problems 21-28
$\frac{dr}{dθ} = \frac{r^{2} + 2 rθ}{θ^{2}}$

Short Answer

Step by step solution

General form of Bernoulli equation

Evaluate the given equation

Integrate the equation

Substitution method

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Use the method discussed under “Bernoulli Equations” to solve problems 21-28drdθ=r2+2rθθ2

Short Answer

Step by step solution

General form of Bernoulli equation

Evaluate the given equation

Integrate the equation

Substitution method

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Probability and Statistics

Mechanics Maths

Pure Maths

Theoretical and Mathematical Physics

Discrete Mathematics

Logic and Functions

Study anywhere. Anytime. Across all devices.

Use the method discussed under “Bernoulli Equations” to solve problems 21-28
$\frac{dr}{dθ} = \frac{r^{2} + 2 rθ}{θ^{2}}$