Data Structures & Algorithms
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- DSA - Discussion
- DSA - Useful Resources
- DSA - Quick Guide
- DSA - Questions and Answers
- DSA - Fibonacci Series
- DSA - Tower of Hanoi
- DSA - Recursion Basics
- DSA - Heap
- DSA - Tries
- DSA - Spanning Tree
- DSA - Splay Trees
- DSA - B+ Trees
- DSA - B Trees
- DSA - Red Black Trees
- DSA - AVL Tree
- DSA - Binary Search Tree
- DSA - Tree Traversal
- DSA - Tree Data Structure
- DSA - Breadth First Traversal
- DSA - Depth First Traversal
- DSA - Graph Data Structure
- DSA - Quick Sort
- DSA - Shell Sort
- DSA - Merge Sort
- DSA - Selection Sort
- DSA - Insertion Sort
- DSA - Bubble Sort
- DSA - Sorting Algorithms
- DSA - Hash Table
- DSA - Interpolation Search
- DSA - Binary Search
- DSA - Linear Search
- DSA - Queue
- DSA - Expression Parsing
- DSA - Stack
- DSA - Circular Linked List
- DSA - Doubly Linked List
- DSA - Linked List Basics
- DSA - Array Data Structure
- DSA - Data Structures and Types
- DSA - Data Structure Basics
- DSA - Dynamic Programming
- DSA - Divide and Conquer
- DSA - Greedy Algorithms
- DSA - Asymptotic Analysis
- DSA - Algorithms Basics
- DSA - Environment Setup
- DSA - Overview
- DSA - Home
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DSA - Fibonacci Series
Data Structure & Algorithms Fibonacci Series
Fibonacci series generates the subsequent number by adding two previous numbers. Fibonacci series starts from two numbers − F0 & F1. The initial values of F0 & F1 can be taken 0, 1 or 1, 1 respectively.
Fibonacci series satisfies the following conditions −
Fn = Fn-1 + Fn-2
Hence, a Fibonacci series can look pke this −
F8 = 0 1 1 2 3 5 8 13
or, this −
F8 = 1 1 2 3 5 8 13 21
For illustration purpose, Fibonacci of F8 is displayed as −
Fibonacci Iterative Algorithm
First we try to draft the iterative algorithm for Fibonacci series.
Procedure Fibonacci(n) declare f0, f1, fib, loop set f0 to 0 set f1 to 1 <b>display f0, f1</b> for loop ← 1 to n fib ← f0 + f1 f0 ← f1 f1 ← fib <b>display fib</b> end for end procedure
To know about the implementation of the above algorithm in C programming language,
.Fibonacci Recursive Algorithm
Let us learn how to create a recursive algorithm Fibonacci series. The base criteria of recursion.
START Procedure Fibonacci(n) declare f0, f1, fib, loop set f0 to 0 set f1 to 1 display f0, f1 for loop ← 1 to n fib ← f0 + f1 f0 ← f1 f1 ← fib display fib end for END
To see the implementation of above algorithm in c programming language,
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