Solution to State TRUE or FALSE justifying your answer with proper reason. a. 2𝑛^2 + 1 = … - Sikademy
Author Image

Archangel Macsika

State TRUE or FALSE justifying your answer with proper reason. a. 2𝑛^2 + 1 = 𝑂(𝑛^2 ) b. 𝑛^2 (1 + βˆšπ‘›) = 𝑂(𝑛^2 ) c. 𝑛^2 (1 + βˆšπ‘›) = 𝑂(𝑛^2 log 𝑛) d. 3𝑛^2 + βˆšπ‘› = 𝑂(𝑛 + π‘›βˆšπ‘› + βˆšπ‘›) e. βˆšπ‘› log 𝑛 = 𝑂(𝑛)

The Answer to the Question
is below this banner.

Can't find a solution anywhere?

NEED A FAST ANSWER TO ANY QUESTION OR ASSIGNMENT?

Get the Answers Now!

You will get a detailed answer to your question or assignment in the shortest time possible.

Here's the Solution to this Question

a.

true

2𝑛^2 + 1\le 3n^2


b.

false

\displaystyle \lim_{n\to \infin} \frac{𝑛^2 (1 + \sqrt𝑛) }{n^2}=\infin


c.

false

\displaystyle \lim_{n\to \infin} \frac{𝑛^2 (1 + \sqrt𝑛) }{n^2logn}=\infin


d.

false

\displaystyle \lim_{n\to \infin} \frac{ 3𝑛^2 + \sqrt𝑛) }{𝑛 + 𝑛\sqrt𝑛 + \sqrt𝑛}=\infin


e.

true

\sqrt𝑛 log 𝑛\le n

Related Answers

Was this answer helpful?

Join our Community to stay in the know

Get updates for similar and other helpful Answers

Question ID: mtid-5-stid-8-sqid-419-qpid-306