Answer:
10,200 Cal. per day
Explanation:
The mouse consumes 3.0 Cal each day, and has a mass of 20 grams. We can use this data to obtain a ratio of energy consumption per mass
[tex]\frac{3.0 \ Cal}{20 g} = 0.15 \frac{Cal}{g}[/tex].
For the human, we need to convert the 68 kilograms to grams. We can do this with a conversion factor. We know that:
[tex]1 \ kg = 1000 \ g[/tex],
Now, we can divide by 1 kg on each side
[tex]\frac{1 \ kg}{1 \ kg} = \frac{1000 \ g}{1 \ kg}[/tex],
[tex] 1 = \frac{1000 \ g}{1 \ kg}[/tex].
Using this conversion factor, we can obtain the mass of the human in grams, instead of kilograms. First, lets take:
[tex]mass_{human} = 68 \ kg[/tex]
We can multiply this mass for the conversion factor, we are allowed to do this, cause the conversion factor equals 1, and its adimensional
[tex]mass_{human} = 68 \ kg * \frac{1000 \ g}{1 \ kg} [/tex]
[tex]mass_{human} = 68,000 g [/tex]
Now that we know the mass of the human on grams, we can multiply for our ratio of energy consumption
[tex]68,000 \ g * 0.15 \frac{Cal}{g} = 10,200 \ Cal[/tex]
So, we would need 10,200 Cal per day.
