```
v1 = [33, 24, 55, 56]
v2 = [32, 25, 51, 40]
v3 = [ ... ]
v4 = [ ... ]
```

Normally, to find which vector is the most similar to v1, I would run v1 against the other vectors with a **cosine similarity algorithm**.

Now, I have a more complex set of vectors with the structure:

```
v1 = [ { 'a': 4, 'b':9, 'c': 12 ... },
{ 'a', 3, 'g':3, 'b': 33 ... },
{ 'b', 1, 'k': 6, 'n': 19 ... },
...
]
v2 = [ {}, {}, {} ... ]
v3 = [ {}, {}, {} ... ]
v4 = [ {}, {}, {} ... ]
```

Given this structure, how would you calculate similarity? (*A good match would be a vector with many keys similar to v1, with values of those keys very similar as v1's values*)

btilly's answer:

```
def cosine_sim_complex(v, w):
'''
Complex version of cosine similarity
'''
def complicated_dot(v, w):
dot = 0
for (v_i, w_i) in zip(v, w):
#{ _, _ }, {_, _}
for x in v_i:
if x in w_i:
dot += v_i[x] * w_i[x]
return float(dot)
length_v = float(complicated_dot(v, v) ** 0.5)
length_w = float(complicated_dot(w, w) ** 0.5)
score = complicated_dot(v, w) / length_v / length_w
return score
v1 = [ {'a':44, 'b':21 }, { 'a': 55, 'c': 22 } ]
v2 = [ {'a':99, 'b':21 }, { 'a': 55, 'c': 22 } ]
cosine_sim_complex(v1, v2)
1.01342687531
```