Final answer:
The dimensions of the rectangle with the largest area are 0 units for the length and 9 units for the width.
Step-by-step explanation:
To find the dimensions of the rectangle with the largest area, we need to consider the vertices of the rectangle on the graph of the parabola y=9-x^2.
The base of the rectangle will be on the x-axis, so the y-coordinate of the upper vertices of the rectangle will be y=9.
Let's find the x-coordinate of the upper vertices by setting y=9 in the equation:
9=9-x^2
x^2=0
x=0
So, the x-coordinate of the upper vertices is 0.
Now, we can calculate the dimensions of the rectangle.
The length of the rectangle will be 2 times the x-coordinate of the upper vertices, which is 2*0=0.
The width of the rectangle will be the y-coordinate of the upper vertices, which is 9.
Therefore, the dimensions of the rectangle with the largest area are 0 units for the length and 9 units for the width.