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Recent activity by pinky31
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general preparation advice
Everyone says that if one is serious for GATE, solving standard book questions is important. I am reading the concepts and solving GATE questions but I am not able to follow any strategy for standard book questions. Any advice would be appreciated.
Everyone says that if one is serious for GATE, solving standard book questions is important.I am reading the concepts and solving GATE questions but I am not able to foll...
348
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asked
Sep 21, 2018
GATE
gate-preparation
study-resources
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10
answers
2
GATE CSE 2000 | Question: 2.17
Consider the following functions $f(n) = 3n^{\sqrt{n}}$ $g(n) = 2^{\sqrt{n}{\log_{2}n}}$ $h(n) = n!$ Which of the following is true? $h(n)$ is $O(f(n))$ $h(n)$ is $O(g(n))$ $g(n)$ is not $O(f(n))$ $f(n)$ is $O(g(n))$
Consider the following functions$f(n) = 3n^{\sqrt{n}}$$g(n) = 2^{\sqrt{n}{\log_{2}n}}$$h(n) = n!$Which of the following is true?$h(n)$ is $O(f(n))$$h(n)$ is $O(g(n))$$g(n...
22.9k
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commented
Jul 23, 2016
Algorithms
gatecse-2000
algorithms
asymptotic-notation
normal
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1
answer
3
Kenneth Rosen
Let (A,*) be a semigroup. Furthermore let there be an element a in A such that for every x in A there exists u and v in A satisfying the relation- a*u=v*a=x. Prove that there is an identity element in A
Let (A,*) be a semigroup. Furthermore let there be an element a in A such that for every x in A there exists u and v in A satisfying the relation-a*u=v*a=x.Prove that the...
339
views
asked
Jun 26, 2016
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