SOLUTION: Q:1- Construct two examples of topology T on finite set X having at least two elements such that that Topology T is also metric space. . Note: Elements of set X must be non negat

Algebra ->  Test -> SOLUTION: Q:1- Construct two examples of topology T on finite set X having at least two elements such that that Topology T is also metric space. . Note: Elements of set X must be non negat      Log On


   

Question 1194929: Q:1- Construct two examples of topology T on finite set X having at least two elements such that that Topology T is also metric space.
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Note: Elements of set X must be non negative integers.

Q:2- Can we have such linear independent vectors in R² or R³ which are not bases in R² or R³?

Q:3- Find g.c.d of 76 and 133 using euclidean algorithm?

Q:4- What is the main difference between Reimann Integration and Lebesgue Integration?
Answer by ikleyn(52780) About Me  (Show Source):
You can put this solution on YOUR website!
.

Regarding Q3, read and learn from this Internet source

https://onlinecalculator.guru/lcmgcf/hcf-of-133-76-by-euclid-division-algorithm/


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