5th percentile welfare range per calorie consumption as a fraction of that of humans
Median welfare range per calorie consumption as a fraction of that of humans
95th percentile welfare range per calorie consumption as a fraction of that of humans
Bees
0
4.88 k
31.7 k
Shrimp
0
83.9
3.11 k
Crayfish
0
17.5
226
Salmon
0
3.61
33.1
Chickens
1.50 %
2.49
6.52
Humans
1.00
1.00
1.00
Pigs
0.459 %
47.3 %
94.7 %
Discussion
The median welfare ranges per calorie consumption vary a lot. The values for bees and pigs are 4.88 k and 0.473 times as high as that for humans[8].
In addition, the values are higher for non-human animals. 5 of the 6 species I analysed have values higher than that of humans. Moreover, the lower the calorie consumption, the higher the median welfare range per calorie consumption. These suggest welfare can be created more efficiently via small non-human animals. However, one should also account for:
The energy needed besides that in food.
The level of welfare as a fraction of the median welfare range.
I would still guess that it is possible to achieve higher total welfare with mostly small non-human animals, in agreement with animal welfare arguably being dominated by that of arthropods and nematodes. In the future, one might be able to produce welfare much more efficiently via non-biological beings.
According to Mark Patterson, āin summer a full strength Honey Bee hive contains around 50-60,000 workers and needs to consume around 1800 calories per dayā. So I used 0.0327 kcal/ād (= 1.8/ā((50 + 60)/ā2)).
Adult crayfish weigh 24.8 g (= (23.29 + 26.40)/ā2), and therefore, āat a daily feeding rate of 5 % of body weightā, eat 1.24 g/ād (= 24.8*0.05). The feed contains 3.93 kcal/āg (= 16.43/ā4.184). So I used 4.88 kcal/ād (= 1.24*3.93).
āAfter two years at seaā, adult salmon have ā8 to 12 poundsā, so it grows 6.21 g/ād (= (8 + 12)/ā2*454/ā(2*365.25)). In addition, āAtlantic salmon needs 1.15 kg feed to gain 1 kg body weightā, which translates into 7.15 g/ād (= 6.21*1.15) of feed, which contains 4.88 kcal/āg (= (0.356 + 0.110)*4 + 0.335*9). So I used 34.9 kcal/ād (= 7.15*4.88).
According to Ken Macklin and Joe Hess, āa hen may consume up to 340 calories of metabolizable energy per day during winter to keep warm. But in summer, she may consume only 260 calories of metabolizable energy per dayā. So I used 300 kcal/ād (= (260 + 340)/ā2).
According to the National Health Service, āthe recommended daily calorie intake is 2,000 calories a day for women and 2,500 for menā. So I used 2.25 k kcal/ād (= (2 k + 2.5 k)/ā2).
Welfare ranges per calorie consumption
Summary
I calculated the welfare ranges per calorie consumption for a few species.
They vary a lot. The values for bees and pigs are 4.88 k and 0.473 times as high as that for humans.
They are higher for non-human animals:
5 of the 6 species I analysed have values higher than that of humans.
The lower the calorie consumption, the higher the median welfare range per calorie consumption.
Methods
I calculated the welfare ranges per calorie consumption from the ratio between:
Rethink Prioritiesā 5th percentile, median, and 95th percentile welfare ranges.
Calorie consumption per day for mature individuals. Note there is variation within the same species.
My calculations are here.
Results
The results are below by descending median welfare range per calorie consumption.
Welfare range and calorie consumption
Species
5th percentile welfare range
Median welfare range
95th percentile welfare range
Calorie consumption (kcal/ād)
Bees[1]
0
0.071
0.461
0.0327
Shrimp[2]
0.031
0.831
Crayfish[3]
0.038
4.88
Salmon[4]
0.056
34.9
Chickens[5]
0.332
300
Humans[6]
1
2.25 k
Pigs[7]
0.515
2.45 k
Welfare range per calorie consumption
Species
5th percentile welfare range per calorie consumption (d/ākcal)
Median welfare range per calorie consumption (d/ākcal)
95th percentile welfare range per calorie consumption (d/ākcal)
Bees
2.17
Shrimp
0.0373
Crayfish
7.79 m
Salmon
1.61 m
Chickens
1.11 m
Humans
0.444 m
Pigs
0.210 m
Species
5th percentile welfare range per calorie consumption as a fraction of that of humans
Median welfare range per calorie consumption as a fraction of that of humans
95th percentile welfare range per calorie consumption as a fraction of that of humans
Bees
4.88 k
Shrimp
83.9
Crayfish
17.5
Salmon
3.61
Chickens
2.49
Humans
1.00
Pigs
47.3 %
Discussion
The median welfare ranges per calorie consumption vary a lot. The values for bees and pigs are 4.88 k and 0.473 times as high as that for humans[8].
In addition, the values are higher for non-human animals. 5 of the 6 species I analysed have values higher than that of humans. Moreover, the lower the calorie consumption, the higher the median welfare range per calorie consumption. These suggest welfare can be created more efficiently via small non-human animals. However, one should also account for:
The energy needed besides that in food.
The level of welfare as a fraction of the median welfare range.
I would still guess that it is possible to achieve higher total welfare with mostly small non-human animals, in agreement with animal welfare arguably being dominated by that of arthropods and nematodes. In the future, one might be able to produce welfare much more efficiently via non-biological beings.
According to Mark Patterson, āin summer a full strength Honey Bee hive contains around 50-60,000 workers and needs to consume around 1800 calories per dayā. So I used 0.0327 kcal/ād (= 1.8/ā((50 + 60)/ā2)).
A shrimp of 40 g is fed 0.84 g/ād (= 0.021*40), and shrimp feed has 0.989 kcal/āg (= 84/ā(3*28.3)). So I used 0.831 kcal/ād (= 0.84*0.989).
Adult crayfish weigh 24.8 g (= (23.29 + 26.40)/ā2), and therefore, āat a daily feeding rate of 5 % of body weightā, eat 1.24 g/ād (= 24.8*0.05). The feed contains 3.93 kcal/āg (= 16.43/ā4.184). So I used 4.88 kcal/ād (= 1.24*3.93).
āAfter two years at seaā, adult salmon have ā8 to 12 poundsā, so it grows 6.21 g/ād (= (8 + 12)/ā2*454/ā(2*365.25)). In addition, āAtlantic salmon needs 1.15 kg feed to gain 1 kg body weightā, which translates into 7.15 g/ād (= 6.21*1.15) of feed, which contains 4.88 kcal/āg (= (0.356 + 0.110)*4 + 0.335*9). So I used 34.9 kcal/ād (= 7.15*4.88).
According to Ken Macklin and Joe Hess, āa hen may consume up to 340 calories of metabolizable energy per day during winter to keep warm. But in summer, she may consume only 260 calories of metabolizable energy per dayā. So I used 300 kcal/ād (= (260 + 340)/ā2).
According to the National Health Service, āthe recommended daily calorie intake is 2,000 calories a day for women and 2,500 for menā. So I used 2.25 k kcal/ād (= (2 k + 2.5 k)/ā2).
Mean between the lower and upper bounds of 2.4 k and 2.5 k for breeder pigs.
Fun fact, I was stung by a bee/āwasp just today.