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Re: MTH201 Assignment 1 Solution and Discussion
Spring 2020 MTH201: Multivariable Calculus
Assignment No. 1 (Lectures # 12 to 17) Total Marks: 20
Due Date: Friday, June 19, 2020Please read the following instructions before attempting the solution of this assignment:
To solve this assignment, you should have good command over 12 to 17 lectures.
Try to consolidate your concepts that you learn in the lectures with these questions.
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Write your ID on the top of your solution file.
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Use MathType or Equation Editor etc. for writing mathematical symbols and equations.
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This is an individual assignment (not a group assignment). So keep in mind that you are supposed to submit your own, selfmade and different assignment even if you discuss the questions with your class fellows. All similar assignments (even with some meaningless modifications) will be awarded zero marks and no excuse will be accepted. This is your responsibility to keep your assignment safe from others.Note:
Up to 50% marks might be deducted for those assignments which are received after the due date.Question: Marks: 20
Let be a function of two variables defined on with continuous second order partial derivatives. Determine whether or not f has a relative minimum, a relative maximum and a saddle point in .


Question 1: Let c be the boundary of the region enclosed between . Evaluate by green’s theorem.
Question 2: Evaluate the given integral using green’s theorem.
where c is the rectangle bounded by.