Approximate the zero(s) of the function. Use Newton's Method and continue the process until two successive approximations differ by less than 0.001. Then find the zero(s) using a graphing utility and compare the results. f(x) = x3 + x - 3 Graphing utility: x = Newton's method: x =

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Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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### Approximating the Zero(s) of the Function

#### Problem Statement:
Approximate the zero(s) of the function. Use Newton's Method and continue the process until two successive approximations differ by less than 0.001. Then find the zero(s) using a graphing utility and compare the results.

Given function:
\[f(x) = x^3 + x - 3\]

#### Methods:
1. **Newton's Method:**
   - Initial guess \((x = \_\_\_\_)\)
   
2. **Graphing Utility:**
   - Zero found using graphing utility \((x = \_\_\_\_)\)
   
### Instructions:
1. Apply Newton's Method to find the zero(s) of the given function \(f(x) = x^3 + x - 3\).
2. Continue iterating using Newton's Method until the difference between two successive approximations is less than 0.001.
3. Use a graphing utility to find the zero(s) and record the result.
4. Compare the zero(s) found using Newton's Method with those found using the graphing utility.
Transcribed Image Text:### Approximating the Zero(s) of the Function #### Problem Statement: Approximate the zero(s) of the function. Use Newton's Method and continue the process until two successive approximations differ by less than 0.001. Then find the zero(s) using a graphing utility and compare the results. Given function: \[f(x) = x^3 + x - 3\] #### Methods: 1. **Newton's Method:** - Initial guess \((x = \_\_\_\_)\) 2. **Graphing Utility:** - Zero found using graphing utility \((x = \_\_\_\_)\) ### Instructions: 1. Apply Newton's Method to find the zero(s) of the given function \(f(x) = x^3 + x - 3\). 2. Continue iterating using Newton's Method until the difference between two successive approximations is less than 0.001. 3. Use a graphing utility to find the zero(s) and record the result. 4. Compare the zero(s) found using Newton's Method with those found using the graphing utility.
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