Determining the rate of change of the function

[andym1512]

Hi guys, ive got an interesting engineering related calculus problem and im struggling with it. Any help would be much appreciated guys, thank you!

The legnth of a metal rod L metres at temperature £ oC is given by L = 1 +0.00003£ + 0.0000006£². Determine the rate of change of L in mm/oC when the temperature is 75 oC.

Apologies for using the '£' sign, its just a symbol for a variable. Not sure how to use the correct math symbol when posting on her :s

 

[DrPhil]

Hi guys, ive got an interesting engineering related calculus problem and im struggling with it. Any help would be much appreciated guys, thank you!

The legnth of a metal rod L metres at temperature £ oC is given by L = 1 +0.00003£ + 0.0000006£². Determine the rate of change of L in mm/oC when the temperature is 75 oC.

Apologies for using the '£' sign, its just a symbol for a variable. Not sure how to use the correct math symbol when posting on her :s

If you are struggling, I hope it is because you are NOT taking calculus at the moment, but rather have been given this question in a physics or engineering course.

The derivatives of all three terms are simple.
1st term, derivative of a constant is 0
2nd term, derivative of 1st power is 1
3rd term, derivative of x^2 is 2x
Conversion from m to mm, multiply by 1000

dL/dt = 0.03 mm/C + (0.0012 mm/C^2)*(75 C) = 0.12 mm/C

 

[dave turbo]

How do you get to the answer 0.12 from those workings?

I have the same question and work it out as follows -

L = 1 + 0.00003T + 0.0000006T^2

DL/DT = 0 + 0T + 2 x 0.0000006T (x 1000 for mm)

DL/DT = 0.012


Please correct me?

 

[dave turbo]

PS what are you supposed to do with the 75?

 

[Deleted member 4993]

PS what are you supposed to do with the 75?

Read the original question carefully - and you'll see:

Determine the rate of change of L in mm/oC when the temperature is 75 oC.

Get it!!

 

[dave turbo]

Read the original question carefully - and you'll see:



Get it!!

No I don't get it.
Would the rate be the same for both 0 and 75?

 

[HallsofIvy]

After taking the derivative, evaluate it at T= 75 degrees C.

 

[HallsofIvy]

How do you get to the answer 0.12 from those workings?

I have the same question and work it out as follows -

L = 1 + 0.00003T + 0.0000006T^2

DL/DT = 0 + 0T + 2 x 0.0000006T (x 1000 for mm)

No, dL/dT= 0+ 0.00003+ 2 x 0.0000006T= 0.00003+ .0000012T
Set T= 75: 0.00003+ 0.00009= 0.00012, NOT 0.012

DL/DT = 0.012


Please correct me?