Answer:
Option B and C
Step-by-step explanation:
Given : A rectangular box has length x and width 3. The volume of the box is given by [tex]y = 3x(8-x)[/tex]
To find : The greatest x-intercept of the graph of this polynomial equals which of the following?
Consider rectangular box with volume [tex]y = 3x(8-x)[/tex]
Where,
Length x units (x≥0); (given)
Width 3 units; (given)
Comparing with the formula of volume
[tex]V=length\times width\times height[/tex]
Height (8-x) units i.e, 8-x≥0, then x≤8
The volume of the rectangular box presented as,
[tex]V=x\times 3\times 8-x[/tex]
Maximal possible of height can be 8 units (x=0) and minimal possible height can be 0 (x=8)
We can see from the attached graph,
That the greatest x-intercept is x=8, then the height will be minimal and length will be maximal.
Then the volume will be V=0 (minimal).
Therefore, the correct answer are B (the maximum possible length), C (the minimum possible height).
