Answer:
As per the given statement:
The length of an Algebra 2 textbook is 2 times the height.
Let height be x then;
⇒ [tex]l = 2x[/tex] ......[1]; where l is the length.
Also, the sum of the length, width and height of the box is 10 cm.
⇒[tex]l+w+h=10[/tex] where w is the width. .,.....[2]
Substitute equation [1] in [2] we get;
[tex]2x+w+x=10[/tex] oe
[tex]3x+w =10[/tex] or
[tex]w =10-3x[/tex] ......[3]
(a)
The dimensions of the box is :-
[tex]l = 2x[/tex]
[tex]w = 10 -3x[/tex]
[tex]h =x[/tex]
(b)
Volume of the book is given by:
[tex]V = l \times w \times h[/tex] where V is the volume.
Substitute equation [1] and [3] in above formula;
[tex]V = (2x)(10-3x)(x)[/tex]
[tex]V = (2x^2)(10-3x)[/tex]
The polynomial function for the volume of the book in the factored form:
[tex]V(x)= (2x^2)(10-3x)[/tex]
(c)
To find the maximum volume of the book;
we would find the derivative of volume with respect to x i.e, [tex]\frac{dV}{dx}[/tex]
V(x) = [tex]20x^2-6x^3[/tex] ......[4]
Now;
[tex]\frac{dV}{dx} =40x - 18x^2[/tex]
Set this derivative equal to 0.
[tex]40x -18x^2 = 0[/tex] or
[tex]2x(20-9x) =0[/tex]
By Zero Product Property states that if ab = 0, then
either a = 0 or b = 0, or we have both a and b are 0.
then we have;
[tex]x = 0[/tex] and [tex]x = \frac{20}{9}[/tex]
Then substitute these values in equation [4] to get the values of V(x);
[tex]V(0) = 0[/tex] and
[tex]V(\frac{20}{9} ) = 20(\frac{20}{9})^2-6(\frac{20}{9})^3[/tex] = 32.92(apporx)
So, V(x) = 32.92 which is maximum for [tex]x = \frac{20}{9}[/tex]
Therefore, the graph of function V(x) is shown below and we can clearly see that there is a maximum very close to 2.22..
