Question 9.b.iv was bogus! (1 Viewer)

jiminymacca

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They pretty much give you the equation C=1000 (5-x+2.6 sqrt(x^2+9)) and I assumed you have to find the first derivative of it to get the stationary points and ultimately the minimum, but when I tried to differentiate and solve for dC/dx = 0 I ended up with x^2+9=13/5, which does not have any real solutions! So what happens now? Did I do something wrong??
 

Tumnus

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ooh looks like i got that part right...screwwd another one over though cause i differentiated wrong in the very first step:mad1: corrected it in the last minutes and could finish the part cause tick tock tick tock

d/dx root(3x) = DAMN it i just realised i did that wrong! first one was right....?

DAMN IT, maths i liked you....somewhat

:chainsaw: EXAMS
 
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woah how did u guys differentiate it
C = 5000 - 1000x + 2600(x^2 + 9)^1/2

dC/dx = - 1000 + 1300(x^2 + 9)^(-1/2) x 2x
= - 1000 + 2600x / (x^2 + 9)^(1/2)

min/max at dC/dx = 0

-1000 + 2600x / (x^2 + 9)^(1/2) = 0
-1 + 2.6x / (x^2 + 9)^(1/2) = 0
2.6x / (x^2 + 9)^(1/2) = 1 ---square both sides
6.76x^2 / (x^2 + 9) = 1
6.76x^2 = x^2 + 9
5.76x^2 = 9
x^2 = 25/16
x = 1.25 or -1.25 but x > 0
therefore x = 1.25


at x = 1, dC/dx = -ve
at x = 1.25 dC/dx = 0
at x = 1.5 dC/dx = +ve

therefore \_/ , minimum at x = 1.25

sub it in and the cost C = $12200
 

boxhunter91

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c = 5000 - 1000x + 2600(x^2 + 9)^1/2

dc/dx = - 1000 + 1300(x^2 + 9)^(-1/2) x 2x
= - 1000 + 2600x / (x^2 + 9)^(1/2)

min/max at dc/dx = 0

-1000 + 2600x / (x^2 + 9)^(1/2) = 0
-1 + 2.6x / (x^2 + 9)^(1/2) = 0
2.6x / (x^2 + 9)^(1/2) = 1 ---square both sides
6.76x^2 / (x^2 + 9) = 1
6.76x^2 = x^2 + 9
5.76x^2 = 9
x^2 = 25/16
x = 1.25 or -1.25 but x > 0
therefore x = 1.25


at x = 1, dc/dx = -ve
at x = 1.25 dc/dx = 0
at x = 1.5 dc/dx = +ve

therefore \_/ , minimum at x = 1.25

sub it in and the cost c = $12200
fkn yessssssssssssss! Motherfkrssssssssss
 
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No. Had to account for the new cable cost. Just replace 1.1 for 3.6 in the derivative eqn.
If you replaced 2.6 with 1.1, you will find that C = $7325

From P to S directly, the cost will be only root 34 x 1100 = $6414

From P to R , S to R , cost = 5(1000) + 3(1100) = $8300

Therefore cheapest route is from P to S
 

Thecorey0

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No. Had to account for the new cable cost. Just replace 1.1 for 3.6 in the derivative eqn.
He is right. Once you do that, you get x=root(300/7). But x is between 0 and 5. Hence it does not exist and the cheapest method is straight there.
 

MOP777

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part v) I got from p to q then q to s, because I did what he said ^^^ replaced the 2.6 with 1.1 in the original equation then differentiated again (but you just replace it in the derivative lol)
 

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