Sign in
ui-button
ui-button
Topics
General Knowledge
General Science
General English
Aptitude
General Computer Science
General Intellingence and Reasoning
Current Affairs
Exams
Elementary Mathematics
English Literature
Elementary Mathematics
Real Analysis
In any metric space M, \(\phi\) and M are
A) open
B) closed
C) both open and closed
D) neither open nor closed
Correct Answer:
C) both open and closed
Description for Correct answer:
In any metric space M the null set \(\phi\) and M are both open and closed.
Part of solved Real Analysis questions and answers :
>> Elementary Mathematics
>> Real Analysis
Login to Bookmark
Previous Question
Next Question
Report Error
Add Bookmark
View My Bookmarks
Report error with gmail
Hide
Comments
No comments available
Login to post comment
Similar Questions
1). Any finite suliset of a metric space is
A). open
B). closed
C). both open and closed
D). neither open nor closed
-- View Answer
2). A subset M of \(R^{2}\) is compact if and only if M is ____.
A). closed
B). bounded
C). closed and bounded
D). none of these
-- View Answer
3). Let (M, d) be the discrete metric space and A be any subset of A. Then the derived set of A (the set of all limit points of A) is,
A). A
B). M
C). \(\phi\)
D). \(A^{c}\)
-- View Answer
4). Any finite subset of a metric space has
A). limit points
B). no limit points
C). both (A) and (B) are true
D). none of these
-- View Answer
5). Examine the convergence of \(\Large\int\limits_{0}^{1}\frac{dx}{x^{2}}\)
A). convergent
B). divergent
C). converges to 1
D). converges to 0
-- View Answer
6). Examine the convergence \(\Large\int\limits_{0}^{2}\frac{dx}{2x^{2}-x^{2}}\)
A). converges
B). diverges
C). converges to
D). none of these
-- View Answer
7). The integral \(\Large\int\limits_{1}^{\infty}\frac{dx}{x(x+1)}\)
A). log 2
B). log 3
C). log 5
D). log 7
-- View Answer
8). Examine the convergence of \(\Large\int\limits_{0}^{\pi}\frac{dx}{1+cosx}\).
A). convergent
B). converges to 1
C). converges to 0
D). diverges
-- View Answer
9). Let \(f(x)=x,\ 0\le x\le 1\) and \(p=0,\frac{1}{4},\frac{1}{2},\frac{3}{4},1\) be the partition of [0, 1]. Find U(p, f) and L(p, f).
A). \(\Large \frac{1}{8},\frac{1}{8}\)
B). \(\Large \frac{3}{8},\frac{7}{8}\)
C). \(\Large \frac{5}{8},\frac{3}{8}\)
D). \(\Large \frac{7}{8},\frac{9}{8}\)
-- View Answer
10). Let f(x) be defined on [0, 1] as follows:\[ f(x) = 1\begin{cases}\text{1 when } x \text{ is rational}\\\text{-1 when } x\text{ is irrational}\end{cases}\]
A). Riemann integrable
B). not Rimann integrable
C). continuous
D). none of these
-- View Answer
