Hi, can someone check my work? Thanks
A cup of hot chocolate, in a room temperature of 21c, cools according to Newton's lae of cooling. Determine the rate of cooling, k, of the hot chocolate if it cools from 86c to 65c in 15min.
\(\displaystyle \L\ T-T_{s}=(T_{o}-T_{S})e^{kt}\)
\(\displaystyle \L\ 65-21=(86-21)e^{k15}\)
\(\displaystyle \L\ 44=(65)e^{k15}\)
\(\displaystyle \L\ log44=log(65)e^{k15}\)
\(\displaystyle \L\ log44=k15log(65)e\)
\(\displaystyle \L\frac{log44}{(log65)(e)(15)}=k\)
\(\displaystyle \L\ 0.022=k\)
2. A population of termites is increasing according to the formula
\(\displaystyle \L\ P=p_{0}e^{kt}\). Determine the lenght of time, t, that it atkes theis population to triple its initial population of 1800 if it doubles in 0.35 days.
\(\displaystyle \L\ P=p_{0}e^{kt}\)
\(\displaystyle \L\ 5400=1800e^{0.035t}\)
\(\displaystyle \L\ log5400=log1800e^{0.035t}\)
\(\displaystyle \L\ log5400=(0.035t)(log1800e)\)
\(\displaystyle \L\frac{log5400}{(log1800e)(0.035)}=t\)
\(\displaystyle \L\28.9=t\)
3. A van's engine has overheated to 190c, so the driver pulls over to the side of the road and shuts off the engin. The engin cools to 150c in 5min. The engin must cool to 80c before the driver can start the van again. If the outside temperature if 28c, how long will it be before the driver can restart the van?
\(\displaystyle \L\ T-T_{s}=(T_{o}-T_{S})e^{kt}\)
\(\displaystyle \L\ 80-28=(190-28)e^{kt}\)
..I don't know how to do this one
Thanks
A cup of hot chocolate, in a room temperature of 21c, cools according to Newton's lae of cooling. Determine the rate of cooling, k, of the hot chocolate if it cools from 86c to 65c in 15min.
\(\displaystyle \L\ T-T_{s}=(T_{o}-T_{S})e^{kt}\)
\(\displaystyle \L\ 65-21=(86-21)e^{k15}\)
\(\displaystyle \L\ 44=(65)e^{k15}\)
\(\displaystyle \L\ log44=log(65)e^{k15}\)
\(\displaystyle \L\ log44=k15log(65)e\)
\(\displaystyle \L\frac{log44}{(log65)(e)(15)}=k\)
\(\displaystyle \L\ 0.022=k\)
2. A population of termites is increasing according to the formula
\(\displaystyle \L\ P=p_{0}e^{kt}\). Determine the lenght of time, t, that it atkes theis population to triple its initial population of 1800 if it doubles in 0.35 days.
\(\displaystyle \L\ P=p_{0}e^{kt}\)
\(\displaystyle \L\ 5400=1800e^{0.035t}\)
\(\displaystyle \L\ log5400=log1800e^{0.035t}\)
\(\displaystyle \L\ log5400=(0.035t)(log1800e)\)
\(\displaystyle \L\frac{log5400}{(log1800e)(0.035)}=t\)
\(\displaystyle \L\28.9=t\)
3. A van's engine has overheated to 190c, so the driver pulls over to the side of the road and shuts off the engin. The engin cools to 150c in 5min. The engin must cool to 80c before the driver can start the van again. If the outside temperature if 28c, how long will it be before the driver can restart the van?
\(\displaystyle \L\ T-T_{s}=(T_{o}-T_{S})e^{kt}\)
\(\displaystyle \L\ 80-28=(190-28)e^{kt}\)
..I don't know how to do this one
Thanks
