Answer:
41.7 is the lowest temperature the room reached during the experiment.
Step-by-step explanation:
Given : f(x)=23.7 cos(60πx)+18
Solution :
To find the lowest temperature we need to calculate the derivative of a given function
Then equate that derivative with 0 and calculate the value of x
Then find the double derivative and put the obtained value of x in double derivative
If the solution is positive then the temperature is lowest and if negative then the temperature is highest
Then put that value of x in original f(x)
Using the above steps solve the given function :
f(x)=23.7 cos(60πx)+18
Put the value of π =3.14
f(x)=23.7 cos(188.4x)+18
f'(x) =23.7 (- sin 188.4x)*188.4+0
⇒f'(x) = - 4465.08(sin 188.4x)
Now equate the derivative = 0
⇒f'(x) = - 4465.08(sin 188.4x) =0
⇒Sin 188.4x =0
Using calculator x = 0
NOW calculate f''(x)= - 4465.08(cos 188.4x)*188.4
= 841221.072(cos 188.4x)
Now put value of x =0 in double derivative
⇒ 841221.072(cos 188.4*0)
⇒841221.072(cos 0)
Since cos 0 =1
⇒841221.072>0
Positive hence the solution will be minimum
Now put this value of x in f(x)
⇒f(x)=23.7 cos(188.4*0)+18
⇒f(x)=23.7* cos 0+18
Since cos 0 =1
⇒f(x)=23.7+18
⇒f(x)=41.7
Thus 41.7 is the lowest temperature the room reached during the experiment.
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