I am going to talk about various operations performed on arrays in data structure on 1d arrays specifically. I have already discussed the fundamentals of arrays what is need of Faerie array declaration in acid ization of array memory representation of air in the previous video so if you check out t...
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INTRODUCTION TO ALGORITHMS AND DATA STRUCTURES
Definition: - An algorithm is a Step By Step process to solve a problem, where each step
indicates an intermediate task. Algorithm contains finite number of steps that leads to the
solution of the problem.
Properties /Characteristics of an Algorithm:-
Algorithm has the following basic properties
Input-Output:- Algorithm takes ‘0’ or more input and produces the required output.
This is the basic characteristic of an algorithm.
Finiteness:- An algorithm must terminate in countable number of steps.
Definiteness: Each step of an algorithm must be stated clearly and unambiguously.
Effectiveness: Each and every step in an algorithm can be converted in to
programming language statement.
Generality: Algorithm is generalized one. It works on all set of inputs and provides
the required output. In other words it is not restricted to a single input value.
Categories of Algorithm:
Based on the different types of steps in an Algorithm, it can be divided into three
categories, namely
Sequence
Selection and
Iteration
Sequence: The steps described in an algorithm are performed successively one by one
without skipping any step. The sequence of steps defined in an algorithm should be simple
and easy to understand. Each instruction of such an algorithm is executed, because no
selection procedure or conditional branching exists in a sequence algorithm.
Example:
// adding two numbers
Step 1: start
Step 2: read a,b
Step 3: Sum=a+b
Step 4: write Sum
Step 5: stop
Selection: The sequence type of algorithms are not sufficient to solve the problems, which
involves decision and conditions. In order to solve the problem which involve decision
making or option selection, we go for Selection type of algorithm. The general format of
Selection type of statement is as shown below:
if(condition)
Statement-1;
else
Statement-2;
The above syntax specifies that if the condition is true, statement-1 will be executed
otherwise statement-2 will be executed. In case the operation is unsuccessful. Then
sequence of algorithm should be changed/ corrected in such a way that the system will re-
execute until the operation is successful.
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,Iteration: Iteration type algorithms are used in solving the problems which involves
repetition of statement. In this type of algorithms, a particular number of statements are
repeated ‘n’ no. of times.
Example1:
Step 1 : start
Step 2 : read n
Step 3 : repeat step 4 until n>0
Step 4 : (a) r=n mod 10
(b) s=s+r
(c) n=n/10
Step 5 : write s
Step 6 : stop
Performance Analysis an Algorithm:
The Efficiency of an Algorithm can be measured by the following metrics.
i. Time Complexity and
ii. Space Complexity.
i.Time Complexity:
The amount of time required for an algorithm to complete its execution is its time
complexity. An algorithm is said to be efficient if it takes the minimum (reasonable) amount
of time to complete its execution.
ii. Space Complexity:
The amount of space occupied by an algorithm is known as Space Complexity. An algorithm
is said to be efficient if it occupies less space and required the minimum amount of time to
complete its execution.
1.Write an algorithm for roots of a Quadratic Equation?
// Roots of a quadratic Equation
Step 1 : start
Step 2 : read a,b,c
Step 3 : if (a= 0) then step 4 else step 5
Step 4 : Write “ Given equation is a linear equation “
Step 5 : d=(b * b) _ (4 *a *c)
Step 6 : if ( d>0) then step 7 else step8
Step 7 : Write “ Roots are real and Distinct”
Step 8: if(d=0) then step 9 else step 10
Step 9: Write “Roots are real and equal”
Step 10: Write “ Roots are Imaginary”
Step 11: stop
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,2. Write an algorithm to find the largest among three different numbers entered by user
Step 1: Start
Step 2: Declare variables a,b and c.
Step 3: Read variables a,b and c.
Step 4: If a>b
If a>c
Display a is the largest number.
Else
Display c is the largest number.
Else
If b>c
Display b is the largest number.
Else
Display c is the greatest number.
Step 5: Stop
3.Write an algorithm to find the factorial of a number entered by user.
Step 1: Start
Step 2: Declare variables n,factorial and i.
Step 3: Initialize variables
factorial←1
i←1
Step 4: Read value of n
Step 5: Repeat the steps until i=n
5.1: factorial←factorial*i
5.2: i←i+1
Step 6: Display factorial
Step 7: Stop
4.Write an algorithm to find the Simple Interest for given Time and Rate of Interest .
Step 1: Start
Step 2: Read P,R,S,T.
Step 3: Calculate S=(PTR)/100
Step 4: Print S
Step 5: Stop
ASYMPTOTIC NOTATIONS
Asymptotic analysis of an algorithm refers to defining the mathematical
boundation/framing of its run-time performance. Using asymptotic analysis, we can very
well conclude the best case, average case, and worst case scenario of an algorithm.
Asymptotic analysis is input bound i.e., if there's no input to the algorithm, it is concluded
to work in a constant time. Other than the "input" all other factors are considered
constant.
Asymptotic analysis refers to computing the running time of any operation in mathematical
units of computation. For example, the running time of one operation is computed as f(n)
and may be for another operation it is computed as g(n2). This means the first operation
running time will increase linearly with the increase in n and the running time of the
second operation will increase exponentially when n increases. Similarly, the running time
of both operations will be nearly the same if n is significantly small.
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, The time required by an algorithm falls under three types −
Best Case − Minimum time required for program execution.
Average Case − Average time required for program execution.
Worst Case − Maximum time required for program execution.
Asymptotic Notations
Following are the commonly used asymptotic notations to calculate the running time
complexity of an algorithm.
Ο Notation
Ω Notation
θ Notation
Big Oh Notation, Ο
The notation Ο(n) is the formal way to express the upper bound of an algorithm's running
time. It measures the worst case time complexity or the longest amount of time an
algorithm can possibly take to complete.
For example, for a function f(n)
Ο(f(n)) = { g(n) : there exists c > 0 and n0 such that f(n) ≤ c.g(n) for all n > n0. }
Omega Notation, Ω
The notation Ω(n) is the formal way to express the lower bound of an algorithm's running
time. It measures the best case time complexity or the best amount of time an algorithm
can possibly take to complete.
For example, for a function f(n)
Ω(f(n)) ≥ { g(n) : there exists c > 0 and n0 such that g(n) ≤ c.f(n) for all n > n0. }
Theta Notation, θ
The notation θ(n) is the formal way to express both the lower bound and the upper bound
of an algorithm's running time. It is represented as follows −
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