Answer:
Step-by-step explanation:
If you assume concentration of salt per unit water remains constnat, find the constant.
Initially, for 400 gal of water, you have 20 pounds of salt
20lb/400gal=0.05lb salt per gal of water.
Now do part a)
I will use the following variables:
[tex]y(t)[/tex]: lb of salt in tank at time t
[tex]o(t)[/tex]: lb of salt pumped out at time t
[tex]i(t)[/tex]: lb of salt pumped in at time t
[tex]a[/tex]: lb of salt initially in tank
the equation is
total salt=initial salt+salt in-salt out
[tex]y(t)=a+i(t)-o(t)[/tex]
we know that [tex]a[/tex] is 20lb
[tex]i(t)[/tex] is 5 gal per minute, but we want lbs salt so 5gal/min*0.05lb/gal=0.25lb/min. but this is per time, so multiply by t to get 0.25t
[tex]o(t)[/tex] is 4gal per minute, but we want lbs salt so 3gal/min*0.05lb/gal=0.20lb/min. but this is per time, so multiply to get 0.20t
subsitute all in
[tex]y(t)=a+i(t)-o(t)[/tex]
[tex]y(t)=20+0.25t-0.20t[/tex]
[tex]y(t)=20+0.05t[/tex]
part b)
to solve this initial value problem, I would need to be given either a goal amount of salt ([tex]y(t)[/tex]) or a time elapsed [tex]t[/tex]. Since none are given, the IVP cannot be solved.
