Assuming 8-bit channels, the 3-tuple of integers (R,G,B) can be thought of as a single number in base 256: `R*256**2 + G*256 + B`

. Thus we can convert the 3 arrays R,G,B into a single array of "color values" and use `np.bincount`

to produce the desired histogram.

```
import numpy as np
def using_bincount(r,g,b):
r=r.ravel().astype('int32')
g=g.ravel().astype('int32')
b=b.ravel().astype('int32')
output=np.zeros((base*base*base),dtype='int32')
result=np.bincount(r*base**2+g*base+b)
output[:len(result)]+=result
output=output.reshape((base,base,base))
return output
def using_histogramdd(r,g,b):
data = np.vstack((r.flat, g.flat, b.flat)).astype(np.uint8).T
del(r); del(g); del(b)
hist, edges = np.histogramdd(
data, bins=base, range=([0,base],[0,base],[0,base])
)
return hist
np.random.seed(0)
n = 200
base = 256
r = np.random.randint(base, size=(n,n,n)).astype(np.uint8)
g = np.random.randint(base, size=(n,n,n)).astype(np.uint8)
b = np.random.randint(base, size=(n,n,n)).astype(np.uint8)
if __name__=='__main__':
bhist=using_bincount(r,g,b)
hhist=using_histogramdd(r,g,b)
assert np.allclose(bhist,hhist)
```

These timeit results suggest using_bincount is faster than using_histogramdd, perhaps because histogramdd is built for handling floats and bins which are ranges, while bincount is solely for counting integers.

```
% python -mtimeit -s'import test' 'test.using_bincount(test.r,test.g,test.b)'
10 loops, best of 3: 1.07 sec per loop
% python -mtimeit -s'import test' 'test.using_histogramdd(test.r,test.g,test.b)'
10 loops, best of 3: 8.42 sec per loop
```