How can I simplify the expression k<n/(n^{1/2}+n^{1/4}+1/2) using the big O notation?

Jimena Hatfield

Jimena Hatfield

Answered question

2022-09-04

How can I simplify the expression k < n n 1 / 2 + n 1 / 4 + 1 / 2 using the big O notation?
I'm learning about big O notation and I'm having problems with this exercise. Let be n and k positive integers, how can I simplify the expression k < n n 1 / 2 + n 1 / 4 + 1 / 2 using a dominant power of n and and a big O of a menor power of n. This is what I have done:
k < n n 1 / 2 + n 1 / 4 + 1 / 2 , we know that for some positive C we have that C n 1 / 4 n 1 / 4 + 1 / 2 C n 1 / 4 , then k < n n 1 / 2 O ( n 1 / 4 ) , so k < n 1 / 2 1 O ( n 1 / 4 ) . Then k ( 1 O ( n 1 / 4 ) ) < n 1 / 2 , so k k O ( n 1 / 4 ) < n 1 / 2 .
I want to change the k in the expression k O ( n 1 / 4 ) in terms of some power o n and I have been struggling with that. Any one have any advice?

Answer & Explanation

Karla Bautista

Karla Bautista

Beginner2022-09-05Added 16 answers

Step 1
For large n, you have n 1 / 2 n 1 / 4 1 / 2, so give n1/2 as a factor.
k < n n 1 / 2 ( 1 + n 1 / 4 + 1 / 2 n 1 / 2 )
n 1 / 4 and 1 / 2 n 1 / 2 are small. Then use
1 1 + x 1 x
Step 2
Therefore
k < n 1 / 2 ( 1 O ( n 1 / 4 ) ) = n 1 / 2 O ( n 1 / 4 )

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