1.1 The Fibonacci Sequence
The Fibonacci numbers, sometimes known as Fn, create a series in which each number is the sum
of the two numbers before it. Although some authors ignore the initial words and begin the sequence
from 1 and 1 or from 1 and 2, the pattern typically starts from 0 and 1.
The following values follow 0 and 1 in the sequence: 0, 1, 1, 2, 3, 5, 8, 13, 21, 34,...
1.2 The previous two digits are combined to yield the following number:
- The 1 is found by adding the two numbers that precede it (0+1),
- The 2 by adding the two numbers that come before it (1+1),
- The 3 by adding the two numbers that come before it (1+2),
- The 5 by adding the two numbers that come before it (2+3), and so on!
1.3 Mathematically, Fibonacci can be represented by:
F(1) = 1
F(2) = 1
F(n) = F(n − 1) + F(n − 2)
1.4 pictorial representation
2 Fibonacci Algorithm
2.1 Non-Recursive Iterative Algorithm for Fibonacci
Procedures or subroutines written in a programming language that do not refer to themselves
are known as non-recursive functions.
2.1.1 Algorithm non-recursive Fibonacci
Procedure Iterative_Fibonacci(n):
int f0, f1, fib
f0 = 0
f1 = 1
display f0, f1
for int i:= 1 to n:
fib := f0 + f1
f0 := f1
f1 := fib
display fib
END for loop
END Iterative_Fibonacci
2.1.2 Python implementation
num_terms = int(input("Number of terms? "))
# first two terms
f1, f2 = 0, 1
count = 0
# checking for the validity of the number of terms
if num_terms <= 0:
print("Enter a positive integer")
# if there is only one term, return f1
elif num_terms == 1:
print("Fibonacci sequence to",num_terms,":")
print(f1)
# generate fibonacci sequence
else:
print("Fibonacci sequence:")
while count < num_terms:
print(f1)
nths = f1 + f2
# update values
f1 = f2
f2 = nths
count += 1
2.2 Recursive implementation of the Fibonacci sequence
Recursion is a powerful programming concept that provides an effective way to solve large problems by
breaking them down into simpler subproblems, using this approach, it's often possible to unravel
seemingly complex problems via repeated application of very simple solutions to the subproblems.
When we speak about recursion in programming, we are simply talking about recursive functions.
A recursive function is a function that calls itself somewhere in its definition, The function is defined in terms of itself.
2.2.1 Properties of Recursion
- There must be a reachable base case where the function stops calling itself otherwise infinite loop will occur
- The argument of the function must be modified with each call.
- Performing the identical operations multiple times with different inputs.
- For each step, we apply smaller inputs to reduce the complexity of the problem.
2.2.2 Algorithm of Recursive Fibonacci
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
2.2.3 Python implementation
def fibo(n):
if n <= 1:
return n
else:
return(fibo(n-1) + fibo(n-2))
nterms = int(input('enter an integer? '))
# check if the number of terms is valid
if nterms <= 0:
print("Please enter a positive integer")
else:
print("Fibonacci sequence:")
for i in range(nterms):
print(recur_fibo(i))
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