Matchmaticians
Home How it works Log in Sign up
Matchmaticians
  • Home
  • Search
  • How it works
  • Ask Question
  • Tags
  • Support
  • Affiliate Program
  • Log in
  • Sign up

Calculus - stationary points, Taylor's series, double integrals..

Attached file has 4 questions to answer. I have attempted these but would appreciate seeing someone else attempt them before I submit. Must show all working please.

Calculus Integrals Linear Equation
Canpastilla Canpastilla
Matchmaticians Calculus - stationary points, Taylor's series, double integrals.. File #1 File #1 (pdf)
Report
  • Share:

Answer

Answers can be viewed only if
  1. The questioner was satisfied and accepted the answer, or
  2. The answer was disputed, but the judge evaluated it as 100% correct.
View the answer

Solutions are attached. Please leave a comment if you need any clarifications. 

1 Attachment

Nirenberg Nirenberg
The answer is accepted.
  • answered
  • 115 views
  • $48.43

Related Questions

  • Let $f(x,y,z)=(x^2\cos (yz), \sin (x^2y)-x, e^{y \sin z})$. Compute the derivative matrix $Df$.
  • Find the antiderrivative of $\int \frac{v^2-v_o^2}{2\frac{K_e\frac{q_1q_2}{r^2}}{m} } dr$ 
  • Prove that $\int_{-\infty}^{\infty}\frac{\cos ax}{x^4+1}dx=\frac{\pi}{2}e^{-\frac{a}{\sqrt{2}}}(\cos \frac{a}{\sqrt{2}}+\sin \frac{a}{\sqrt{2}} )$
  • Use the equation to show  the maximum, minimum, and minimum in the future. 
  • Use Rouche’s Theorem to show that all roots of $z ^6 + (1 + i)z + 1 = 0$ lines inside the annulus  $ \frac{1}{2} \leq |z| \leq \frac{5}{4}$
  • Solve the attached problem 
  • Calculus and Vector
  • (Calculus 1) Basic Calc: Derivatives, optimization, linear approximation...
Home
Support
Ask
Log in
  • About
  • About Us
  • How it works
  • Review Process
  • matchmaticians
  • Privacy Policy
  • Terms of Use
  • Affiliate Program
  • Questions
  • Newest
  • Featured
  • Unanswered
  • Contact
  • Help & Support Request
  • Give Us Feedback

Get the Matchmaticians app

A button that says 'Download on the App Store', and if clicked it will lead you to the iOS App store Get Matchmaticians on Google Play
Copyright © 2019 - 2023 Matchmaticians LLC - All Rights Reserved

Search

Search Enter a search term to find results in questions