Hello....again.
I have a question, where I believe I think my answers are correct, but the answers on my Webtest say that I am wrong (hope that makes sense
) Anyway:
Q:
A farmer has 1737 meters of fencing and wants to enclose a large rectangular area and divide it into 3 parallel pens. What are the dimensions of the entire rectangle such that the enclosed are is maximised?
[attachment=0:ri55g0j0]pens.jpg[/attachment:ri55g0j0]
\(\displaystyle L = 1737\)
\(\displaystyle L = 6b + 4a = 1737\)
\(\displaystyle a = \frac{1737 - 6b}{4}\)
\(\displaystyle (AREA) A = 3ab\)
\(\displaystyle = 3 \left[\frac{1737 - 6b}{4}\right] b\)
\(\displaystyle = \frac{3}{4} (1737 - 6b^2)\)
Differentiate:
\(\displaystyle \frac{dA}{db} = \frac{3}{4} (1737 - 12b)\)
Maximum A = \(\displaystyle \frac{dA}{db} = 0\)
\(\displaystyle \frac {3}{4} (1737 - 12b) = 0\)
\(\displaystyle b = \frac {1737}{12} = 144.75\)
\(\displaystyle a = \frac {1737 - 6 (144.75)}{4} = 217.125\)
Now, when I plug in the a and b values into the \(\displaystyle L = 6b + 4a\) equation I get 1737 right? But the answers on my Webtest are:
Length of parallels = 217.13 m - YES
Length of end sides = 434.25 m - NO??? (What is going on here??)
Why doesn't this work?
Thank you for your help
Beckie
I have a question, where I believe I think my answers are correct, but the answers on my Webtest say that I am wrong (hope that makes sense
) Anyway:Q:
A farmer has 1737 meters of fencing and wants to enclose a large rectangular area and divide it into 3 parallel pens. What are the dimensions of the entire rectangle such that the enclosed are is maximised?
[attachment=0:ri55g0j0]pens.jpg[/attachment:ri55g0j0]
\(\displaystyle L = 1737\)
\(\displaystyle L = 6b + 4a = 1737\)
\(\displaystyle a = \frac{1737 - 6b}{4}\)
\(\displaystyle (AREA) A = 3ab\)
\(\displaystyle = 3 \left[\frac{1737 - 6b}{4}\right] b\)
\(\displaystyle = \frac{3}{4} (1737 - 6b^2)\)
Differentiate:
\(\displaystyle \frac{dA}{db} = \frac{3}{4} (1737 - 12b)\)
Maximum A = \(\displaystyle \frac{dA}{db} = 0\)
\(\displaystyle \frac {3}{4} (1737 - 12b) = 0\)
\(\displaystyle b = \frac {1737}{12} = 144.75\)
\(\displaystyle a = \frac {1737 - 6 (144.75)}{4} = 217.125\)
Now, when I plug in the a and b values into the \(\displaystyle L = 6b + 4a\) equation I get 1737 right? But the answers on my Webtest are:
Length of parallels = 217.13 m - YES
Length of end sides = 434.25 m - NO??? (What is going on here??)
Why doesn't this work?
Thank you for your help
Beckie
