okay so I would
e-kt=(T-Ts)/(98.6-Ts)
lne-kt=ln(T-Ts)/(98.6-Ts)
The ln would cancel out the e
-kt=ln(T-Ts)/(98.6-Ts)
then divide by -k? to get
t=(1/-k)ln(T-Ts)/(98.6-Ts)...?
so this would be my answer for finding the inverse ..?
Right, because the T wouldn't just disappear.
So next I would change the U back to a e-kt for e-kt=(T-Ts)/(98.6-Ts)
from there would I try to figure out the e-kt ?
So I would put it as 0=Ts+(98.6-Ts)U ??
Doing that would give me -Ts/(98.6-Ts)=U
Then putting the e-kt back in you get -Ts/(98.6-Ts)=e-kt
So then I would then need to get that by it's self so the t is by itself but I can't remember how to do this. Please advise. Thank you
T(t) = Ts+(98.6 – Ts)e-kt
rewrite in the form t=g-1(T)
In trying to understand how to find the inverse of this but am having a hard time, please advise.
Thanks,
Kupkake303