Respuesta :
Answer:
minimum cost of construction box are x = x = 3.4199 in and y = 10.2598 in and z = 4.2750 in
Step-by-step explanation:
given data
volume = 150 in³
base material costing = 5 cents/in²
front cost = 10 cents/in²
remainder sides cost = 2 cents/in²
to find out
the dimensions that will minimize the cost
solution
we consider here length = x and breadth = y and height = z
and
area of base = xy
area of front = xz
and area of remaining side = xz + 2yz .....................1
so
cost of base will be = 5xy
cost of front = 10xz
cost of remaining side = 2 ( xz+ 2yz)
and
total cost will be
total cost TC = 5xy + 10xz + 2 ( xz+ 2yz)
total cost TC = 5xy + 10xz + 2xz+ 4yz
total cost TC = 5xy + 12xz + 4yz ....................2
and total volume will be = xyz
150 = xyz
z = [tex]\frac{150}{xy}[/tex] .......................3
now put z value in equation 2
total cost TC = 5xy + 12xz + 4yz
total cost TC = 5xy + 12x[tex]\frac{150}{xy}[/tex] + 4y[tex]\frac{150}{xy}[/tex]
total cost TC = 5xy + [tex]\frac{1800}{y}[/tex] + [tex]\frac{600}{x}[/tex] ...........4
now differentiate TC w.r.t x and y
TC (x) = 5y - [tex]\frac{600}{x^2}[/tex]
TC (x) = 5x - [tex]\frac{1800}{y^2}[/tex]
now equating with 0 these
5y - [tex]\frac{600}{x^2}[/tex] = 0
x² = [tex]\frac{120}{y}[/tex]
and
5x - [tex]\frac{1800}{y^2}[/tex] = 0
x = [tex]\frac{360}{y^2}[/tex]
solve we get
y = 10.2598
x = 3.4199
now put x and y value in equation 3
z = [tex]\frac{150}{xy}[/tex]
z = [tex]\frac{150}{3.4199*10.2598}[/tex]
z = 4.2750
so minimum cost of construction box are x = x = 3.4199 in and y = 10.2598 in and z = 4.2750 in
