Find the following derivatives. The given equation is:\[ g(x) = e^{4x^{3}+8} - 2x^{5} + 3 \]This expression represents a function $ g(x) $ which is composed of three main parts:1. **Exponential Term**: $ e^{4x^{3}+8} $ - This part involves the exponential function $ e $ raised to the power of a cubic expression $ 4x^{3} $, shifted by 8. The exponential function is known for its rapid growth, and the exponent here dictates the rate and direction of growth depending on the value of $ x $.2. **Polynomial Term**: $-2x^{5}$ - This is a polynomial term where the variable $ x $ is raised to the 5th power and multiplied by -2. Polynomial expressions of this kind typically shape the graph by adding regions of rapid increase or decrease.3. **Constant Term**: $ +3 $ - This is a simple constant term that shifts the whole function upward by 3 units on the graph. In summary, the function $ g(x) $ is a composite of an exponential expression, a polynomial term, and a constant shift. The complexity of the function results in a graph with significant variation, featuring sections of rapid growth and decline.

Name: Find the following derivatives. The given equation is:\[ g(x) = e^{4x^
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Description: Find the following derivatives. The given equation is:\[ g(x) = e^{4x^{3}+8} - 2x^{5} + 3 \]This expression represents a function $ g(x) $ which is composed of three main parts:1. **Exponential Term**: $ e^{4x^{3}+8} $ - This part involves the

Given : g(x) = e4x3 + 8 - 2x5 + 3

Answered: 8(x) = e** 4x² +8 _ 2x³ +3 - 3

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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Find the following derivatives.

The given equation is:

\[ g(x) = e^{4x^{3}+8} - 2x^{5} + 3 \]

This expression represents a function $ g(x) $ which is composed of three main parts:

1. **Exponential Term**: $ e^{4x^{3}+8} $
- This part involves the exponential function $ e $ raised to the power of a cubic expression $ 4x^{3} $, shifted by 8. The exponential function is known for its rapid growth, and the exponent here dictates the rate and direction of growth depending on the value of $ x $.

2. **Polynomial Term**: $-2x^{5}$
- This is a polynomial term where the variable $ x $ is raised to the 5th power and multiplied by -2. Polynomial expressions of this kind typically shape the graph by adding regions of rapid increase or decrease.

3. **Constant Term**: $ +3 $
- This is a simple constant term that shifts the whole function upward by 3 units on the graph.

In summary, the function $ g(x) $ is a composite of an exponential expression, a polynomial term, and a constant shift. The complexity of the function results in a graph with significant variation, featuring sections of rapid growth and decline.

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