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Chapter 2: Problem 34

Find \(d y /\left.d x\right|_{x=-2},\) given that \(y=(x+2) / x\)

Short Answer

Expert verified
The derivative at \( x = -2 \) is \( -\frac{1}{2} \).

Step by step solution

01

Given Function

We are given the function: \( y = \frac{x+2}{x} \). We need to differentiate this function to find \( \frac{dy}{dx} \).
02

Rewrite the Function

First, rewrite the function in a more convenient form for differentiation. This can be expressed as: \( y = \frac{x+2}{x} = 1 + \frac{2}{x} \).
03

Differentiate the Function

Differentiate the rewritten function with respect to \( x \).Use the power rule and the constant rule: \( \frac{dy}{dx} = 0 + \frac{d}{dx}(2x^{-1}) = -2x^{-2} = \frac{-2}{x^2} \).
04

Evaluate the Derivative at \( x = -2 \)

Substitute \( x = -2 \) into the derivative: \( \frac{dy}{dx} = \frac{-2}{(-2)^2} = \frac{-2}{4} = -\frac{1}{2} \).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Power Rule
The power rule is an essential technique in calculus used to find the derivative of functions. It is a straightforward method that works on terms where the variable is raised to a power. If you have a function of the form \( y = x^n \), then the power rule tells us that its derivative is \( \frac{dy}{dx} = nx^{n-1} \). This process involves:
  • Multiplying the exponent by the coefficient of the term.
  • Reducing the exponent by one.
For instance, in the function \( y = 2x^{-1} \), we apply the power rule as follows:- The exponent is \(-1\), so we multiply \(2\) by \(-1\) to get \(-2\).- Then, we decrease the exponent by 1, resulting in \(-2x^{-2}\).
This process transforms differentiation into a simple algebraic operation, making it easier to handle more complex functions.
Constant Rule
The constant rule is another fundamental concept in differentiation. It deals with terms that are not dependent on variables, i.e., constants. If you have a constant term \(c\), then the derivative of this term with respect to any variable \(x\) is zero. Mathematically, this is expressed as:
  • \( \frac{d}{dx}(c) = 0 \)
Using this rule in our function, \( y = 1 + \frac{2}{x} \), let's focus on the constant term \(1\).
Since it does not include any variable, its derivative is simply zero. By knowing the constant rule, we streamline finding the derivative of mixed terms, where some components are constants.
Derivative Evaluation
Derivative evaluation refers to substituting a specific value into the derivative of a function to find the rate of change at that particular point. This step is essential once you have determined the derivative, as it provides insight into the behavior of the function at a specific input.In our exercise, after finding the derivative to be \( \frac{dy}{dx} = \frac{-2}{x^2} \), we evaluate this at \( x = -2 \). Here are the steps:
  • Substitute \( x = -2 \) into the expression \( \frac{-2}{x^2} \).
  • Calculate \( (-2)^2 \) which results in \(4\).
  • Thus, \( \frac{-2}{4} \) simplifies to \( -\frac{1}{2} \).
This approach gives us the slope of the tangent line or the rate at which \(y\) changes with respect to \(x\) at \(x = -2\). This calculated value, \(-\frac{1}{2}\), provides concrete data about the function's instantaneous behavior at the specified point.

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Most popular questions from this chapter

Newton's Law of Universal Gravitation states that the magnitude \(F\) of the force exerted by a point with mass \(M\) on a point with mass \(m\) is $$ F=\frac{G m M}{r^{2}} $$ $$ \begin{array}{l}{\text { where } G \text { is a constant and } r \text { is the distance between the bod- }} \\ {\text { ies. Assuming that the points are moving, find a formula for }} \\ {\text { the instantaneous rate of change of } F \text { with respect to } r .}\end{array} $$

The force \(F\) (in pounds) acting at an angle \(\theta\) with the horizontal that is needed to drag a crate weighing \(W\) pounds along a horizontal surface at a constant velocity is given by $$ F=\frac{\mu W}{\cos \theta+\mu \sin \theta} $$ where \(\mu\) is a constant called the coefficient of sliding friction between the crate and the surface (see the accompanying figure). Suppose that the crate weighs \(150 \mathrm{lb}\) and that \(\mu=0.3\) (a) Find \(d F / d \theta\) when \(\theta=30^{\circ} .\) Express the answer in units of pounds/degree. (b) Find \(d F / d t\) when \(\theta=30^{\circ}\) if \(\theta\) is decreasing at the rate of \(0.5 \%\) /s at this instant.

Find \(d y / d x\) $$ y=\frac{1+\csc \left(x^{2}\right)}{1-\cot \left(x^{2}\right)} $$

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