A small metal bar, whose initial temperature was 10° C, is dropped into a large container of boiling water. How long will it take the bar to reach 70° C if it is known that its temperature increases 2° during the first second? (The boiling temperature for water is 100° C. Round your answer to one decimal place.) sec How long will it take the bar to reach 98° C? (Round your answer to one decimal place.)

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wagonbelleville wagonbelleville · Answer 1 · 2019-09-27T09:08:49+02:00

Answer

According to newton law of cooling

[tex]\dfrac{d T}{dt} = k (T - T_a)[/tex]

and

[tex]T = Ce^{kt} + T_a[/tex]

now At Ta = 100

T₀ = 10 °C

T₁ = 12° C

[tex]T(0) = Ce^{0} + T_a[/tex]

10 = C + 100

C = -90

now,

[tex]12 = -90e^k + 100[/tex]

[tex]e^k = \dfrac{88}{90}[/tex]

[tex]k = ln{\dfrac{88}{90}}[/tex]

at time equal to t

T(t) = 70

[tex]T(t) = -90 (\dfrac{88}{90})^t + 100[/tex]

[tex]70 = -90(\dfrac{88}{90})^t + 100[/tex]

[tex](\dfrac{88}{90})^t = \dfrac{1}{3}[/tex]

[tex]t\times ln(\dfrac{88}{90}) = ln(\dfrac{1}{3})[/tex]

t = 48.88 s

hence, after 48.88 s the temperature of the body will be 70°C

b) time taken to reach 98°C

[tex]T(t) = -90 (\dfrac{88}{90})^t + 100[/tex]

[tex]98 = -90(\dfrac{88}{90})^t + 100[/tex]

[tex](\dfrac{88}{90})^t = \dfrac{1}{45}[/tex]

[tex]t\times ln(\dfrac{88}{90}) = ln(\dfrac{1}{45})[/tex]

t = 390 s

hence, after 390 s the temperature of the body will be 98°C