DSA summary
1)Introduction to Data Structures & Algorithms
2)Time Complexity and Big O Notation (with notes)
4)Asymptotic Notations: Big O, Big Omega, and Big Theta Explained (With Notes)
5)How to Calculate the time Complexity of an Algorithm + Solved Questions (With Notes)
How to Calculate Time Complexity of an Algorithm + Solved Questions (With
Notes)
Before Solving Some Questions of Time Complexity I will tell you some
tricks to get rid of time complexity. After that we will do some set of
questions. which will make you a very good grasp in such questions. due
to the time complexity of any algorithm when you have to find it so what
is the first step that you do and at the same time how to approach this
problem. In this way, whatever instructions are going on here , it is
taking almost ( k ) time. We believe that these operations are all (k )
time consuming This for loop , that is , how much time is being taken for
this fragment It seems ( kn ) , okay So before this ( int i ) would have
been written here, ( int k=0 ) would be written here. The third technique
that I want to tell you is this : That break the code into fragments. The
first fragment turned out to be this one , with a little bit of
initialization. It took constant time because it is not such that if the
value of ( n ) increases, then its time will increases.
I will go for ( n = 100 ) to determine whether i will be going for n =
1000. I will accept it in ( k4) and ( n * k4 ) I will do it in k4 and (n*
k4), and it will happen O (n²) If you do it ( k=0 ) , ( k < n ) and if
you look at it , it will come out O ( n²) Okay, it will not (N²) ok
remember you this thing. There will be some code on it which will take
( k1 ) Now I have become so smart, by doing questions , and you will be
done too That (k1) it is will going to be non-dominant , if constant is
being added then we will remove it. So once the value of ( i ) will be
zero (0) and then the value of ( j ) will run for. Then ( j=1) will
become Then ( 0,2) Then (i=0 , and j=0 ) will then run for Okay. The
value of ( i ) will be zero ( 0 ) for ( n ) times running then the value
of (i ) will become ( 1 ) , it will run again (n ) times then it will go
on till n. When ( n) is running out, watch carefully , watch very
closely. Then later I will ask the question, then I am telling if it is
not done. value of i will be ( 1) , ( n ), it will be n-1 because I am
taking the index ( i=0 ) then (i=n-1) will be and here is ( n- 1 )
I told you guys If it 's not clear to you why it will work ( n² ) times
So I 'd say let 's go look at it for 3 and 3 and print here (i , j ) and
make a count variable and count it , how many times it is running You
write ( c ) program , write in Python, write in Java, write in Python and
write in the Java. But when there are 2 loops inside one , then that will
run for n² times. And if another loop is given inside it , then it will
run ( n³ ) times. If there is a double for loop, then it becomes straight
(n² ) I have handpicked some questions which I am going to give to you
guys here. And I have also given their programs to you. So you see here I
have opened this folder in visual studio code. So it 's saying that Find
the time complexity ( Func1 ) function in the program shown in program1.
c as follows. Even if you come from another programming language nothing
is going to be change. The time of (F1+F2+F3) will be that I will take as
the overall time of the whole function. The time is not depending on
The benefits of buying summaries with Stuvia:
Guaranteed quality through customer reviews
Stuvia customers have reviewed more than 700,000 summaries. This how you know that you are buying the best documents.
Quick and easy check-out
You can quickly pay through credit card or Stuvia-credit for the summaries. There is no membership needed.
Focus on what matters
Your fellow students write the study notes themselves, which is why the documents are always reliable and up-to-date. This ensures you quickly get to the core!
Frequently asked questions
What do I get when I buy this document?
You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.
Satisfaction guarantee: how does it work?
Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.
Who am I buying these notes from?
Stuvia is a marketplace, so you are not buying this document from us, but from seller ravitarora. Stuvia facilitates payment to the seller.
Will I be stuck with a subscription?
No, you only buy these notes for $4.69. You're not tied to anything after your purchase.