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#!/usr/bin/python3
# https://theweeklychallenge.org/blog/perl-weekly-challenge-258/#TASK2
#
# Task 2: Sum of Values
# =====================
#
# You are given an array of integers, @int and an integer $k.
#
# Write a script to find the sum of values whose index binary representation has
# exactly $k number of 1-bit set.
#
## Example 1
##
## Input: @ints = (2, 5, 9, 11, 3), $k = 1
## Output: 17
##
## Binary representation of index 0 = 0
## Binary representation of index 1 = 1
## Binary representation of index 2 = 10
## Binary representation of index 3 = 11
## Binary representation of index 4 = 100
##
## So the indices 1, 2 and 4 have total one 1-bit sets.
## Therefore the sum, $ints[1] + $ints[2] + $ints[3] = 17
#
## Example 2
##
## Input: @ints = (2, 5, 9, 11, 3), $k = 2
## Output: 11
#
## Example 3
##
## Input: @ints = (2, 5, 9, 11, 3), $k = 0
## Output: 2
#
############################################################
##
## discussion
##
############################################################
#
# For each element of the list:
# - calculate the number of 1-bit sets
# - compare to $k
# - return result of all ints[$i] where $i has $k 1-bits set
def dec2bin(num: int) -> str:
return bin(num)[2:]
def sum_of_values(ints: list, k: int):
print("Input: (", ", ".join(str(x) for x in ints) , "), ", k, sep="")
result = 0
for index in range(len(ints)):
bin = dec2bin(index)
bits_set = 0
for bit in list(bin):
if bit == "1":
bits_set += 1
if bits_set == k:
result += ints[index]
print(f"Output: {result}")
sum_of_values([2, 5, 9, 11, 3], 1);
sum_of_values([2, 5, 9, 11, 3], 2);
sum_of_values([2, 5, 9, 11, 3], 0);
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