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Question
At 10.00 A.M. a woman took a cup of hot instant coffee from her microwave oven and placed it on a nearby kitchen counter to cool. At this instant, the temperature of the coffee was 180°F and 10 minutes later it was 160°F. Assume that the constant temperature of the kitchen was 70°F. The woman likes to drink coffee when its temperature is between130°F and 140°F. between what times should she have drunk the coffee? `|log 6/11 = - 0.2006|`
Solution
Let T be the temperature of a coffee at time t.
Tk be the temperature of the kitchen
By Newton’s law of cooling
`"d"/"dt" = "k"("T" - "T"_"k")`
Given Tk =70
`"dT"/"dt" = "k"("T" - 70)`
The equation can be written as
`"dT"/("T" - 70)` k dt
Taking integration on both sides,
`int "dT"/("T" - 70) = int "k" "dt"`
`log("T" - 70) = int "dt"`
`lg("T" - 70)` = kt + log c
`log("T" - 70) - log "c"` = kt
`log(("T" - 70)/"c")` = kt
`("T" - 70)/"c" = "e"^"kt"`
`"T" - 70 = "ce"^"kt"`
T = `"ce"^"kt" + 70` ........(1)
Initial condition:
When t = 0, T = 180°F
180 = cek(0) + 70
180 = ce° + 70
180 – 70 = c
∴ c = 110°
Substituting c value in equation (1), we get
T = ce+kt + 70
T = 100 ekt + 70 ........(2)
Second condition:
when t = 10, T = 160
(2) ⇒ 160 = 110 e10k + 70
160 – 70 = 110 e10k
`90/10` = e10k
`9/11` = e10k
ek = `(9/11)^(1/10)` .........(3)
Woman’s like to drink a coffee between 130°F and 140°F.
(a) when T = 130°F
(2) ⇒ T = 110 ekt + 70
130 – 70 = 110 ekt
`60/110 = 6/11` = ekt
ekt = `6/11`
`(9/11)^("t"/10) = 6/11` ........(By (3))
Taking g on both sides, we get
`log(9/11)^("t"/10) = log 6/11`
`"t"/10 log(9/11) = log 6/11`
`"t"/10 = (log(6/11))/(log(9/11))`
`"t"/10 = (log(0.55))/(log(0.818))`
= `(- 0264)/(- 0.087)`
= 3.0345
t = 10 × 3.0345
= 30.345
(b) When T = 140°
(2) ⇒ T = 110 ekt + 70
160 – 70 = 110 ekt
`70/110` = ekt
`7/11` = ekt
ekt = `7/11`
`(9/11)^("t"/10) = 7/11` ........(By (3))
Taking log on both sides, we get
`log(9/10)^("t"/10) = log 7/11`
`"t"/10 (9/11) = log 7/11`
`"t"/10 = (log(7/11))/(log 9/11)`
= `(- 0.197)/(- 0.087)`
= 2.264
t = `10 xx 2.264`
t = 22.6 min
She drinks coffee between 10.22 and 10.30 approximately.
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