A2. The equation modelling the temperature, in degrees Celcius, for Florida is given by T(x) = 10 +0.0003³ -0.2x where T is the temperature in degrees Celcius and x is time in weeks. What of the following is NOT a reasonable Domain for this question? Ox= [0,52] O{ € R|0 ≤ x ≤ 52} Ο χ ε [0,12] O{re Rx ≥ 0} Question 3 ( A6. The population of a town in Northern Ontario is modelled by the equation p(t) = 5t-0.0030+³ +125 where p is the population in thousands and t is time in years since 2000. When will the population reach 170 000? HINT: You can use graphing technology to solve this 2009 It never reaches this population 2009, and 2035 approximately 1956, 2009, and 2035, approximately D

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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what are the answers for both?
18
A2. The equation modelling the temperature, in degrees Celcius, for Florida is given
10+ 0.00032³ 0.2x where T is the temperature in degrees
by T(x)
=
Celcius and x is time in weeks. What of the following is NOT a reasonable Domain
for this question?
Οι ε[0,52]
O{ER|0 ≤x≤ 52}
Οæ e [0,12]
O{r € Rx ≥ 0}
Question 3 (
A6. The population of a town in Northern Ontario is modelled by the equation
p(t) = 5t-0.0030t³ + 125 where p is the population in thousands and t
is time in years since 2000. When will the population reach 170 000? HINT: You can
use graphing technology to solve this
2009
It never reaches this population
2009, and 2035 approximately
1956, 2009, and 2035, approximately
Transcribed Image Text:18 A2. The equation modelling the temperature, in degrees Celcius, for Florida is given 10+ 0.00032³ 0.2x where T is the temperature in degrees by T(x) = Celcius and x is time in weeks. What of the following is NOT a reasonable Domain for this question? Οι ε[0,52] O{ER|0 ≤x≤ 52} Οæ e [0,12] O{r € Rx ≥ 0} Question 3 ( A6. The population of a town in Northern Ontario is modelled by the equation p(t) = 5t-0.0030t³ + 125 where p is the population in thousands and t is time in years since 2000. When will the population reach 170 000? HINT: You can use graphing technology to solve this 2009 It never reaches this population 2009, and 2035 approximately 1956, 2009, and 2035, approximately
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