Answer:
2.32 feet
Step-by-step explanation:
Given;
The cross section of the bottom of a circular pound has the shape of a parabola
Now,
For the circular parabola, the equation is given as:
y² = 4ax
here,
y is the depth
x is the horizontal distance from the center
a is the constant
also,
at diameter of the pond = 24 feet
and,
at x = 0 ; y = 8 feet
now,
the point 2 feet from the shore with respect to the center of the pond = radius of the pond - The distance from the shore
= [tex]\frac{\textup{24}}{\textup{2}}[/tex] - 2 = 10 feet
thus,
at x = 10 feet ; y = 3 feet
thus,
we have
the equation as:
3² = 4a × 10
or
0.9 = 4a
or
a = 0.225
therefore,
we get the equation as;
y² = ( 4 × 0.225 ) × x
and, for point 6 feet away from the shore, i.e [tex]\frac{\textup{24}}{\textup{2}}[/tex] - 6 = 6 feet away from the center
we have
y² = ( 4 × 0.225 ) × 6
or
y² = 5.4
or
y = 2.32 feet (negative value is neglected as the depth cannot be negative)
