How To Find The Time Complexity Of An Algorithm?
Now let us see some other examples and the process to find the time complexity of an algorithm:
Example: Let us consider a model machine that has the following specifications:
- Single processor
- 32 bit
- Sequential execution
- 1 unit time for arithmetic and logical operations
- 1 unit time for assignment and return statements
Q1. Find the Sum of 2 numbers on the above machine:
For any machine, the pseudocode to add two numbers will be something like this:
// Pseudocode : Sum(a, b) { return a + b }
#include <iostream>
using namespace std;
int sum(int a,int b)
{
return a+b;
}
int main() {
int a = 5, b = 6;
cout<<sum(a,b)<<endl;
return 0;
}
// This code is contributed by akashish__
Pseudocode : Sum(a, b) { return a + b }
// Pseudocode : Sum(a, b) { return a + b }
import java.io.*;
class GFG {
public static int sum(int a, int b) { return a + b; }
public static void main(String[] args)
{
int a = 5, b = 6;
System.out.println(sum(a, b));
}
}
// This code is contributed by akashish__
# Pseudocode : Sum(a, b) { return a + b }
a = 5
b = 6
def sum(a,b):
return a+b
# function call
print(sum(a,b))
// Pseudocode : Sum(a, b) { return a + b }
using System;
public class GFG {
public static int sum(int a, int b) { return a + b; }
static public void Main()
{
int a = 5, b = 6;
Console.WriteLine(sum(a, b));
}
}
// This code is contributed by akashish__
// Pseudocode : Sum(a, b) { return a + b }
function sum(a, b) {
return a + b;
}
let a = 5, b = 6;
console.log(sum(a, b));
// This code is contributed by akashish__
Output
11
Time Complexity:
- The above code will take 2 units of time(constant):
- one for arithmetic operations and
- one for return. (as per the above conventions).
- Therefore total cost to perform sum operation (Tsum) = 1 + 1 = 2
- Time Complexity = O(2) = O(1), since 2 is constant
Auxiliary Space: O(1)
Q2. Find the sum of all elements of a list/array
The pseudocode to do so can be given as:
#include <iostream>
using namespace std;
int list_Sum(int A[], int n)
// A->array and
// n->number of elements in array
{
int sum = 0;
for (int i = 0; i <= n - 1; i++) {
sum = sum + A[i];
}
return sum;
}
int main()
{
int A[] = { 5, 6, 1, 2 };
int n = sizeof(A) / sizeof(A[0]);
cout << list_Sum(A, n);
return 0;
}
// This code is contributed by akashish__
Pseudocode : list_Sum(A, n)
// A->array and
// n->number of elements in array
{
sum = 0
for i = 0 to n-1
sum = sum + A[i]
return sum
}
// Java code for the above approach
import java.io.*;
class GFG {
static int list_Sum(int[] A, int n)
// A->array and
// n->number of elements in array
{
int sum = 0;
for (int i = 0; i <= n - 1; i++) {
sum = sum + A[i];
}
return sum;
}
public static void main(String[] args)
{
int[] A = { 5, 6, 1, 2 };
int n = A.length;
System.out.println(list_Sum(A, n));
}
}
// This code is contributed by lokeshmvs21.
# A function to calculate the sum of the elements in an array
def list_sum(A, n):
sum = 0
for i in range(n):
sum += A[i]
return sum
# A sample array
A = [5, 6, 1, 2]
# Finding the number of elements in the array
n = len(A)
# Call the function and print the result
print(list_sum(A, n))
using System;
public class GFG {
public static int list_Sum(int[] A, int n)
// A->array and
// n->number of elements in array
{
int sum = 0;
for (int i = 0; i <= n - 1; i++) {
sum = sum + A[i];
}
return sum;
}
static public void Main()
{
int[] A = { 5, 6, 1, 2 };
int n = A.Length;
Console.WriteLine(list_Sum(A, n));
}
}
// This code is contributed by akashish__
function list_Sum(A, n)
// A->array and
// n->number of elements in array
{
let sum = 0;
for (let i = 0; i <= n - 1; i++) {
sum = sum + A[i];
}
return sum;
}
let A = [ 5, 6, 1, 2 ];
let n = A.length;
console.log(list_Sum(A, n));
// This code is contributed by akashish__
Output
14
To understand the time complexity of the above code, let’s see how much time each statement will take:
int list_Sum(int A[], int n)
{
int sum = 0; // cost=1 no of times=1
for(int i=0; i<n; i++) // cost=2 no of times=n+1 (+1 for the end false condition)
sum = sum + A[i] ; // cost=2 no of times=n
return sum ; // cost=1 no of times=1
}
Pseudocode : list_Sum(A, n)
{
total =0 // cost=1 no of times=1
for i=0 to n-1 // cost=2 no of times=n+1 (+1 for the end false condition)
sum = sum + A[i] // cost=2 no of times=n
return sum // cost=1 no of times=1
}
public class ListSum {
// Function to calculate the sum of elements in an array
static int listSum(int[] A, int n) {
int sum = 0; // Cost = 1, executed 1 time
for (int i = 0; i < n; i++) { // Cost = 2, executed n+1 times (+1 for
// the end false condition)
sum = sum + A[i]; // Cost = 2, executed n times
}
return sum; // Cost = 1, executed 1 time
}
// Main method for testing
public static void main(String[] args) {
int[] array = {1, 2, 3, 4, 5};
int length = array.length;
int result = listSum(array, length);
System.out.println("Sum: " + result);
}
}
def list_sum(A):
sum = 0
for i in range(len(A)):
sum = sum + A[i]
return sum
using System;
class Program
{
// Function to calculate the sum of elements in a list
static int ListSum(int[] A)
{
int sum = 0; // Initialize sum to 0
// Loop to iterate through the array elements
for (int i = 0; i < A.Length; i++)
{
sum = sum + A[i]; // Accumulate the sum
}
return sum; // Return the calculated sum
}
// Driver code
static void Main()
{
// Example usage
int[] array = { 1, 2, 3, 4, 5 };
int result = ListSum(array);
Console.WriteLine(result);
}
}
function listSum(A) {
let sum = 0; // Initialize sum to 0
// Loop to iterate through the array elements
for (let i = 0; i < A.length; i++) {
sum = sum + A[i]; // Accumulate the sum
}
return sum; // Return the calculated sum
}
// Example usage
let array = [1, 2, 3, 4, 5];
let result = listSum(array);
console.log(result);
Therefore the total cost to perform sum operation
Tsum=1 + 2 * (n+1) + 2 * n + 1 = 4n + 4 =C1 * n + C2 = O(n)
Therefore, the time complexity of the above code is O(n)
Q3. Find the sum of all elements of a matrix
For this one, the complexity is a polynomial equation (quadratic equation for a square matrix)
- Matrix of size n*n => Tsum = a.n2 + b.n + c
- Since Tsum is in order of n2, therefore Time Complexity = O(n2)
#include <iostream>
using namespace std;
int main()
{
int n = 3;
int m = 3;
int arr[][3]
= { { 3, 2, 7 }, { 2, 6, 8 }, { 5, 1, 9 } };
int sum = 0;
// Iterating over all 1-D arrays in 2-D array
for (int i = 0; i < n; i++) {
// Printing all elements in ith 1-D array
for (int j = 0; j < m; j++) {
// Printing jth element of ith row
sum += arr[i][j];
}
}
cout << sum << endl;
return 0;
}
// contributed by akashish__
/*package whatever //do not write package name here */
import java.io.*;
class GFG {
public static void main(String[] args)
{
int n = 3;
int m = 3;
int arr[][]
= { { 3, 2, 7 }, { 2, 6, 8 }, { 5, 1, 9 } };
int sum = 0;
// Iterating over all 1-D arrays in 2-D array
for (int i = 0; i < n; i++) {
// Printing all elements in ith 1-D array
for (int j = 0; j < m; j++) {
// Printing jth element of ith row
sum += arr[i][j];
}
}
System.out.println(sum);
}
}
// akashish__
n = 3
m = 3
arr = [[3, 2, 7], [2, 6, 8], [5, 1, 9]]
sum = 0
# Iterating over all 1-D arrays in 2-D array
for i in range(n):
# Printing all elements in ith 1-D array
for j in range(m):
# Printing jth element of ith row
sum += arr[i][j]
print(sum)
# This code id contributed by shivhack999
using System;
class MainClass {
static void Main(string[] args)
{
int n = 3;
int m = 3;
int[, ] arr
= { { 3, 2, 7 }, { 2, 6, 8 }, { 5, 1, 9 } };
int sum = 0;
// Iterating over all 1-D arrays in 2-D array
for (int i = 0; i < n; i++) {
// Printing all elements in ith 1-D array
for (int j = 0; j < m; j++) {
// Printing jth element of ith row
sum += arr[i, j];
}
}
Console.WriteLine(sum);
}
}
let n = 3;
let m = 3;
let arr = [[3, 2, 7], [2, 6, 8], [5, 1, 9]];
let sum = 0;
// Iterating over all 1-D arrays in 2-D array
for (let i = 0; i < n; i++) {
// Printing all elements in ith 1-D array
for (let j = 0; j < m; j++) {
// Printing jth element of ith row
sum += arr[i][j];
}
}
console.log(sum);
Output
43
Time Complexity: O(n*m)
The program iterates through all the elements in the 2D array using two nested loops. The outer loop iterates n times and the inner loop iterates m times for each iteration of the outer loop. Therefore, the time complexity of the program is O(n*m).
Auxiliary Space: O(n*m)
The program uses a fixed amount of auxiliary space to store the 2D array and a few integer variables. The space required for the 2D array is nm integers. The program also uses a single integer variable to store the sum of the elements. Therefore, the auxiliary space complexity of the program is O(nm + 1), which simplifies to O(n*m).
In conclusion, the time complexity of the program is O(nm), and the auxiliary space complexity is also O(nm).
So from the above examples, we can conclude that the time of execution increases with the type of operations we make using the inputs.
Understanding Time Complexity with Simple Examples
A lot of students get confused while understanding the concept of time complexity, but in this article, we will explain it with a very simple example.
Q. Imagine a classroom of 100 students in which you gave your pen to one person. You have to find that pen without knowing to whom you gave it.
Here are some ways to find the pen and what the O order is.
- O(n2): You go and ask the first person in the class if he has the pen. Also, you ask this person about the other 99 people in the classroom if they have that pen and so on,
This is what we call O(n2). - O(n): Going and asking each student individually is O(N).
- O(log n): Now I divide the class into two groups, then ask: “Is it on the left side, or the right side of the classroom?” Then I take that group and divide it into two and ask again, and so on. Repeat the process till you are left with one student who has your pen. This is what you mean by O(log n).
I might need to do:
- The O(n2) searches if only one student knows on which student the pen is hidden.
- The O(n) if one student had the pen and only they knew it.
- The O(log n) search if all the students knew, but would only tell me if I guessed the right side.
The above O -> is called Big – Oh which is an asymptotic notation. There are other asymptotic notations like theta and Omega.
NOTE: We are interested in the rate of growth over time with respect to the inputs taken during the program execution.
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