Respuesta :
Answer:
[tex]A(x) = 24x - 2x^3[/tex]
Step-by-step explanation:
first we need to visualize what the question is trying to represent
- A rectangle with one of its sides on the x-axis
- The corners of the opposite two sides of the rectangle intersect with a parabola
- the equation of the parabola is [tex]y = 12 - x^2[/tex]
the equation of the parabola can also be written as
[tex]y = -x^2 + 12[/tex] this shows that the parabola has a [tex]\cap[/tex] shape and the turning point (peak) lies at the y-axis at y = 12. The parabola is symmetric along the y-axis!
- right corner of the lower side of the rectangle has the coordinates (x,0)
we can also say that the coordinates of the lower left side are (-x,0). This is because the parabola is symmetric along the y-axis.
Solution:
We have enough information to express the sides lengths of the rectangle:
1) Lower side, (L)
We'll name the lower side 'L' and since this is a rectangle, this side length is the same as the upper side.
The lower side coordinates are (-x,0) and (x,0). Hence the side length is the difference of the two coordinates.
[tex]L = x-(-x) [/tex]
[tex]L = 2x [/tex]
2) The Left and Right side have the same height (H)
since the the lower side is on the x-axis (y=0), the only side moving is the upper one, i.e the coordinates of the upper corners are (0,y) where [tex]y = 12- x^2[/tex]. The side length of either the left or right sides is [tex]y[/tex]
[tex]H = y[/tex]
[tex]H = 12 - x^2[/tex]
The Area of the rectangle is:
[tex]Area\,\,= L \times H [/tex]
[tex]Area\,\,= 2x(12 - x^2) [/tex]
[tex]Area\,\,= 24x-2x^3 [/tex]
