Introduction
The concept of a limit plays a central role in calculus. For example, continuity, derivative and integral require this concept. In this assignment, you are required to explore the concept of a limit.
Sample Question
Question 1
(a) Draw an equilateral triangle inscribed in a circle of radius cm. Express the area of the triangle in term of .
(b) Repeat 1(a) with square, regular pentagon, regular hexagon, …, regular polygon with n sides in the circle of radius cm.
(c) Determine the value of correct to three decimal places when is large.
Question 2
A function is defined by .
(a)(i) Tabulate the values and when x equals to 0.1, 0.01, 0.001, …. Deduce value of .
(a)(ii) Tabulate the values and for , 3 and 4, when equals to 0.1, 0.01, 0.001, …. Deduce value of .
(b) Show that .
Question 3
A function g is defined by , where .
(a) Suppose is an integer, estimate using the trapezium rule with
(i) strips,
(ii) strips,
(iii) strips.
In each case, express in terms of and determine $\lim_{t\to\infty} g(t)$.
(b) Suppose is a real number, find using integration and determine $\lim_{t\to\infty} g(t)$.
(c) Comment on your findings.
Sample Solution
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