Write a quadratic inequality to represent the area of a stained-glass mosaic that sits under a parabolic arch 10 feet tall and 8 feet wide at the base, if the left side of the base is the origin.

where (h,k) is the vertex of the parabola. The width of the parabolic arch at the base is 8 feet, so the vertex of the parabola is located at (4,0). Therefore, the equation for the parabolic arch is

y = a(x - 4)^2

The height of the parabolic arch is 10 feet, so we can represent the area of the stained-glass mosaic as the region where y is between 0 and 10. This can be expressed as the inequality

0 ≤ a(x - 4)^2 ≤ 10

Solving this inequality for x gives us the solution

-2 ≤ x - 4 ≤ 2

which simplifies to

2 ≤ x ≤ 6

Therefore, the quadratic inequality that represents the area of the stained-glass mosaic is

2 ≤ x ≤ 6

Step-by-step explanation:

mhanifa mhanifa · Answer 2 · 2022-12-19T13:44:53+01:00

Answer:

y ≤- 5/8(x - 4)² + 10 and
y ≥ 0

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According to given details we have:

The vertex at (8/2, 10) = (4, 10),
The parabola opens down,
It passes through the origin.

The equation for the parabola is y = a(x - h)² + k, where (h, k) is vertex.

Substitute h = 4, k = 10:

y = a(x - 4)² + 10

We know y = 0 at x = 0, substitute to find the value of a:

0 = a(0 - 4)² + 10
0 = a(16) + 10
16a = - 10
a = - 10/16 = - 5/8

So the parabola is:

y = - 5/8(x - 4)² + 10

We are looking for the area between the parabola and the x-axis, therefore we need two inequalities:

y ≤- 5/8(x - 4)² + 10 and
y ≥ 0

See attached for reference.