OEF sequences --- Introduction ---

This module actually contains 16 exercises on infinite sequences: convergence, limit, recursive sequences, ...

Two limits

Let () be an infinite sequence of real numbers. If one has

and for ,

what can be said about its convergence? (You should choose the most pertinent consequence.)


Comparison of sequences

Let () and () be two sequences of real numbers where () converges towards . If one has

,

what can be said about the convergence of ()? (You must choose the most pertinent consequence.)


Growth and bound

Let () be a sequence of real numbers. If () is , what can be said about its convergence (after its existence)?

Convergence and difference of terms

Let be a sequence of real numbers. Among the following assertions, which are true, which are false?
  1. If , then .

  2. If , then .

Convergence and ratio of terms

Let be a sequence of real numbers. Among the following assertions, which are true, which are false?
  1. If , then .

  2. If , then .

Epsilon

Let be a sequence of real numbers. What does the condition

imply on the convergence of ? (You must choose the most pertinent consequence.)


Fraction 2 terms

Compute the limit of the sequence (un), where


Fraction 3 terms

Compute the limit of the sequence (un), where


Fraction 3 terms II

Compute the limit of the sequence (un), where

WARNING IN this exercise, approximative replies will be considered as false! Type pi instead of 3.14159265, for example.


Growth comparison

What is the nature of the sequence (un), where

 ?


Monotony I

Study the growth, sup, inf, min, max of the sequence (un) for n ge , where

.

Write for a value that does not exist, and or - for +infty or -infty.


Monotony II

Study the growth, sup, inf, min, max of the sequence (un) for n ge , where

.

Write for a value that does not exist, and or - for +infty or -infty.


Powers I

Compute the limit of the sequence (un), where


Powers II

Compute the limit of the sequence (un), where

Type no if the sequence is divergent.


Recursive function

The sequence such that
is a recursive sequence defined by for a certain function . Find this function.

Recursive limit

Find the limit of the recursive sequence such that

Other exercises on: sequences   Convergence   Limit  

The most recent version


This page is not in its usual appearance because WIMS is unable to recognize your web browser.

In order to access WIMS services, you need a browser supporting forms. In order to test the browser you are using, please type the word wims here: and press ``Enter''.

Please take note that WIMS pages are interactively generated; they are not ordinary HTML files. They must be used interactively ONLINE. It is useless for you to gather them through a robot program.

Description: collection of exercises on infinite sequences. interactive exercises, online calculators and plotters, mathematical recreation and games

Keywords: interactive mathematics, interactive math, server side interactivity, analysis, calculus, sequence, limit, convergence