MATH3503 Online Assignment 12

• Make sure to use the link on the Learning Hub, which contains a user name and a user ID unique to you, otherwise your mark would not be recorded. You may use the URL without '?uname=...&uid=...' if you just want to practice. You will get different numbers every time you open the page.
• Numerical answers are evaluated as correct if the difference from the correct value is less than `0.001 times` (correct value) unless otherwise specified. That means, you need to keep at least 5 significant digits (e.g., 12.34, 0.01234, etc.) in your final answer, and a couple of more digits in the intermediate steps.

Infinite series

1.   Complete the following convergence tests.
   1.  
      \(\displaystyle\sum_{n=1}^{\infty}\frac{1}{n^{1.5}}\) converges because \(\displaystyle\int_1^\infty \frac{dx}{x^{1.5}} =~ \)
      
      
   2.  
      \(\displaystyle\sum_{n=1}^{\infty}\frac{1}{n^{0.6}}\) diverges because \(\displaystyle\lim_{k\to\infty}\int_1^k \frac{dx}{x^{0.6}} = \lim_{k\to\infty}\)\(=\infty\)
      
      
2.  
   Consider a geometric series \[ \sum_{k=1}^{\infty}(2x + 3)^k. \]

   1. The range of convergence is \( \lt x \lt \)
   2. If `x=-1.5` then,  \(\displaystyle\sum_{k=1}^{\infty}(2x + 3)^k = \)
   
   
3. Find the Taylor expansion of the following functions about the specified value of `x=x_0` to third order in `x` (i,e, truncate terms after the one containing `(x-x_0)^3`).
   1.  
      About `x=0` \(\displaystyle\frac{1}{1-7x} \approx~ \)
      
      
   2.  
      About `x=0` \(\displaystyle\ln(5+x) \approx~ \)
      
      
   3.  
      About `x=1/5` \(\displaystyle\ln(5x) \approx~ \)
      
      
   4.  
      About `x=0` \(\displaystyle e^{-5x^2} \approx~ \)
      
      
   5.  
      About `x=0`  (Enter pi for `pi`.) \(\displaystyle \sin\left(\frac{\pi x}{7}\right) \approx~ \)
      
      
      
   6.  
      About `x=-3.5` \(\displaystyle \cos\left(\frac{\pi x}{7}\right) \approx~ \)
      
      
4.  
   The restoring force (i.e., `f(0) = 0`) of a retaining wall is modeled as \(f(x) = 7x e^{-5x}\).

   1. Find the linear approximation of `f(x)` about `x=0`. \(\displaystyle f(x) \approx~ \)
   2. To compute the error bound (\(|R_1|\le\frac{M x^2}{2!},~ M=\max_z f''(z)\)) for this linear approximation, first compute \(f''(x)\). \(f''(x) = ~\) *Enter a function of `x`.
   3. The maximum of \(f''\) occurs at `x` that satisfies \(f'''(x) = 0\) (You did it in Calc. 1!) \(\max f''(x) = ~\) *Enter a number.
   4. Thus, the remainder is bounded; \(|R_1| \le ~\) *Enter a function of `x`.
   5. Finally, the range of `x` where the linear approximation is valid can be computed from the fact that the linear term (obtained in a.) is much larger than the error bound for `R_1` found in d. \(|x| \ll ~\)
   
   

If you are ready to submit the result, click Submit!   *Make sure that all questions are evaluated. Click "Check answers!" before clicking "Submit!".