Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Which is true and which false? I can't really decide which one is true and which false. Maybe in first 3 cases.

  1. 3n^5 − 16n + 2 ∈ O(n^5)
  2. 3n^5 − 16n + 2 ∈ O(n)
  3. 3n^5 − 16n + 2 ∈ O(n^17)
  4. 3n^5 − 16n + 2 ∈ Ω(n^5)
  5. 3n^5 − 16n + 2 ∈ Θ(n^5)
  6. 3n^5 − 16n + 2 ∈ Θ(n)
  7. 3n^5 − 16n + 2 ∈ Θ(n^17)

and how to prove this one:

2^(n+1) ∈ O(3^n/n )

share|improve this question

1 Answer 1

up vote 1 down vote accepted

Back to the definitions, with f and g two positive functions :

f∈𝛰(g) ⇔ ∃k,n₀∈ℕ      ∀n>n₀                f(n) ≤ k.g(n)
f∈𝛺(g) ⇔ ∃k,n₀∈ℕ      ∀n>n₀    k.g(n) ≤ f(n)
f∈𝛩(g) ⇔ ∃k₁,k₂,n₀∈ℕ ∀n>n₀  k₁.g(n) ≤ f(n) ≤ k₂.g(n)

It's easy to see that : f∈𝛰(g) and f∈𝛺(g) implies f∈𝛩(g)


Using these definitions it is easy to prove that 1,3,5,6 are true and that 2 and 7 are false; then 1 and 5 true implies 4 true.


for 2^(n+1) ∈ O(3^n/n ) :
can you prove lim 2^(n+1)/ ( 3^n/n ) = 0 when x→+∞ ?
If so, you proved that for all ε>0 there exists δ such that for all n>δ we have 2^(n+1)/(3^n/n)<ε
For ε=2, there exists n₀ such that for all n>n₀ 2^(n+1)<2.3^n/n
what can you conclude ?

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.