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Fibonacci challenge
create a series of numbers in which each number is the multiple of the two preceding numbers. for example : 1, 2 , 2 ,4 ,8 ,32 ..... conditions : #Numbers should start from one #you can refer Fibonacci series as reference 0 ,1 ,1 ,2, 3 ,5, 8 ,13.......but these are sums of two preceding numbers #reach the highest number Go for it.....it might become headech
29 Antworten
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Your example is a little bit vague, so you mean start with 1 & 2?
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You need at least two first term ^^, and if both are equals to 1, the serie will be infinite 1,1,....,1
More accurate to describe your serie as f(0) == 1, f(1) == n != 1, so serie is 1, n, 1*n, n*n, n*n*n, n*n*n*n*n... or rather: n^0, n^1, n^2, n^3, n^5, n^8... So you can say that your serie is rather done by:
f(0) == n^0 == 1
f(1) == n^1 == n
f(x) == f(x-2)*f(x-1) == n^(x-2) * n^(x-1) == n^((x-2)+(x-1)) == n^(2x-3) for x > 1
If I doesn't make mistake ;P (my mathematic skills were far far away ^^)
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Well the sequence grow exponentially fast in this case, I can get up to 11th term only before the integer overflow.
f(0) = 2^0
f(1) = 2^1
f(2) = 2^1
f(3) = 2^2
f(4) = 2^3
f(5) = 2^5
f(6) = 2^8
f(7) = 2^13
f(8) = 2^21
f(9) = 2^34
f(10) = 2^55
f(11) = 2^89
* 12th term failed to fit into 64-bit)
💡 Demo
https://code.sololearn.com/cPvxMQAt80Ac/?ref=app
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You can use recursion to make life easy.
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def sequence(m):
if m==1:
return 2
elif m==2:
return 4
else:
return sequence(m-1)*sequence(m-2)
#2 and 4 are example starting numbera
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@visph Recursion is the easiest way here.
It can work for any 2 inputted starting numbers
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Cmon Visph you can do it! :)
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Hmm the next number going to generate is based on the previous 2 numbers, so we will start with
f(0) = 2 // 1st term
f(1) = 2 // 2nd term
.. and so on
Am I right?
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that was just an example.... your first term should be 1 .....
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ok ...your
f(0) = 1 //1st term
if that helps
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"that was just an example"
conditions specifically says
numbers should "strat" From 1 (one).
the second number can be anything ......
just give me the highest number
and number of terms rather creating an infinite series ;)
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you can try .....
or any different methods .....to do it
but it should give you series ....as expected.
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you miss the 4 ;(
1x2=2
2x2=4
4x2=8
8x4=32.......and so on the next value should be multiple of preceding two numbers
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Arf!
Not still working ^^
It must be fixed again... I will try ;)
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#just enter the number of terms you want
t=int(input(""))
n1,n2=1,2
while(t>0):
print(n1)
n=n1*n2
n1=n2
n2=n
t-=1;
see the answer without
any recursion
© wahid shaikh
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With Python, you doesn't have "highest" number, as Python natively handle big integers (stored as string, so theorically unlimited in size -- but not in memory to handle them ^^)
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@$Vengat:
No need for recursion, as the serie can be computed as a simple function ;) (but using only integer values, so not a continuous function ^^)
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def sequence(n,m):
if '.' in str(m) or '.' in str(n):
print('Value Error')
if m == 0:
print(1)
elif m == 1:
print(n)
else:
print(n**(2*m-3))
for i in range (100):
sequence(2,i)
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@Wahid:
Are you talking to me?
My code only require the f(1) item, as f(0) is 1... run the code, and you will see that third value (f(2)) is 4 (if you give n==2 as f(1) item) ^^
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# Wow... my mistake, that's not working for f(2), you're right: need to add an elif statement for f(2) case:
def sequence(n,m):
if '.' in str(m) or '.' in str(n):
print('Value Error')
if m == 0:
print(1)
elif m == 1:
print(n)
elif m == 2:
print(n*n)
else:
print(n**(2*m-3))
for i in range (100):
sequence(2,i)