Цу-2 x-5 Concave downs Concave Upword= Infection Points:

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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I need help where the concave down and upward in addition to the inflection points
The handwritten text on the lined paper shows mathematical terms related to functions and their properties. It reads:

- "4y - 2"
- "x - 5"

Below this mathematical expression, the paper lists different mathematical characteristics that relate to the behavior of a function:

1. **Concave down** 
   - There is a space to fill in values or conditions where the function is concave down.

2. **Concave upward**
   - There is a space to fill in values or conditions where the function is concave upward.

3. **Inflection Points**
   - Denoted by "x0", suggesting a placeholder for specific values or expressions where inflection points occur.

These terms are related to calculus, specifically the analysis of the concavity of functions and the identification of inflection points.
Transcribed Image Text:The handwritten text on the lined paper shows mathematical terms related to functions and their properties. It reads: - "4y - 2" - "x - 5" Below this mathematical expression, the paper lists different mathematical characteristics that relate to the behavior of a function: 1. **Concave down** - There is a space to fill in values or conditions where the function is concave down. 2. **Concave upward** - There is a space to fill in values or conditions where the function is concave upward. 3. **Inflection Points** - Denoted by "x0", suggesting a placeholder for specific values or expressions where inflection points occur. These terms are related to calculus, specifically the analysis of the concavity of functions and the identification of inflection points.
Expert Solution
Step 1

Given  function is-

Consider -

f(x)=4x-2x-5We need to find cocavity and inflection points.

Inflection points can be determined by putting second derivative equals to zero.

Here we will use the following differentiation formulas-

ddxuv=vdudx-udvdxv2ddxxn=nxn-1ddx(x)=1ddx(constant)=0

 

Step 2

f(x)=4x-2x-5Differentiating with respect to x-f'(x)=ddx4x-2x-5        =(x-5)ddx(4x-2)-(4x-2)ddx(x-5)(x-5)2       =(x-5)(4)-(4x-2)(x-5)2       =4x-20-4x+2(x-5)2 f'(x)=-18(x-5)2Again differentiating with repsect to x-f''(x)=ddx-18(x-5)2         =-18ddx1(x-5)2         =-18ddx(x-5)-2          =36(x-5)-3 f''(x)=36(x-5)3

Step 3

Now,

Inflection point is the point where f''(x) is either 0 or does not exist.

We can observe f''(x) does not exist at x=5

So, 

x=5 is inflection point.

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