🎓 Academic Newton's Law of Cooling Differential Equation

Status
Not open for further replies.

Ferocity

Fanatic
Need help guys, pati sa google di ko makita solution neto.
At 9 A.M., a thermometer reading 70°F is taken outdoors where the temperature is
l 5°F. At 9: 05 A.M., the thermometer reading is 45°F. At 9: 10 A.M., the thermometer is
taken back indoors where the temperature is fixed at 70°F. Find (a) the reading at
9: 20 A.M. and (b) when the reading, to the nearest degree, will show the correct
(70°F) indoor temperature.
Thanks in advance sa sasagot.
 
credit: google

let 9:10am as t=0t=0 and 70F as my ambient temperature, and α=−ln6115α=−ln⁡6115

now I'll have,

when t=0t=0; x(0)=31.4Fx(0)=31.4F

then my new specific solution is

x(t)=−38.64e(116)−t5+70x(t)=−38.64e(116)−t5+70

the temperature at 9:20am is

since 9:10am is t=0, 9:20am is t=10

x(10)=−38.64e(116)−105+70=58.5Fx(10)=−38.64e(116)−105+70=58.5F

@9:20am x=58.5ºFx=58.5ºF
 
Status
Not open for further replies.

About this Thread

  • 2
    Replies
  • 5K
    Views
  • 2
    Participants
Last reply from:
siMp0lMaN

New Topics

Trending Topics

Online now

Members online
1,140
Guests online
1,350
Total visitors
2,490

Forum statistics

Threads
2,285,948
Posts
29,034,631
Members
1,217,739
Latest member
chris631
Back
Top