Consider following things as {v,w} pairs {{40,20},{30,10},{20,5}}. [v = value, w= weight] The knapsack has capacity of 20. What is the maximum output value? [assume that things can be divided while choosing] Options: 40 100 60 80 code example
Example: knapsack algorithm in python
def knapSack(W, wt, val, n):
K = [[0 for x in range(W + 1)] for x in range(n + 1)]
for i in range(n + 1):
for w in range(W + 1):
if i == 0 or w == 0:
K[i][w] = 0
elif wt[i-1] <= w:
K[i][w] = max(val[i-1] + K[i-1][w-wt[i-1]], K[i-1][w])
else:
K[i][w] = K[i-1][w]
return K[n][W]
val = [50,100,150,200]
wt = [8,16,32,40]
W = 64
n = len(val)
print(knapSack(W, wt, val, n))