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maximisation minimisation help :( (1 Viewer)
- Thread starter AnandDNA
- Start date
Chinmoku03
Ippen, Shin de Miru?
Are you sure that the length and width are not related to h, the height value?
ianc
physics is phun!
- Joined
- Nov 7, 2005
- Messages
- 619
- Gender
- Male
- HSC
- 2006
hi there 
let's call the width x, and so this means the length is 3x
V = length*width*height
= 3hx^2 = 4374
rearrange to make h the subject:
h = 1458 / (x^2)
so now we've got our h depending on x
the amount of steel needed is simply done by drawing a diagram and adding up all the lengths (remember not surface area, but the frame)
S = 4(length+width+height)
= 4(3x+x+h)
= 16x + 4h
(substitute the expression for h)
= 16x + 5832 / (x^2)
so we need to differentiate S with respect to x, and solve dS/dx=0 to find the value for x such that S is at a minimum
16 + (-2)5832 / (x^3) = 0
16x^3 = 11664
x = 9
h=18
so the width is 9, length is 27, height is 18
hope this helps
it's a tricky question
let's call the width x, and so this means the length is 3x
V = length*width*height
= 3hx^2 = 4374
rearrange to make h the subject:
h = 1458 / (x^2)
so now we've got our h depending on x
the amount of steel needed is simply done by drawing a diagram and adding up all the lengths (remember not surface area, but the frame)
S = 4(length+width+height)
= 4(3x+x+h)
= 16x + 4h
(substitute the expression for h)
= 16x + 5832 / (x^2)
so we need to differentiate S with respect to x, and solve dS/dx=0 to find the value for x such that S is at a minimum
16 + (-2)5832 / (x^3) = 0
16x^3 = 11664
x = 9
h=18
so the width is 9, length is 27, height is 18
hope this helps
it's a tricky question