One of the parking lot lights at a hospital has a motion detector on it, and the equation (x+10)2+(y−8)2=16 describes the boundary within which motion can be sensed.

What is the greatest distance, in feet, a person could be from the parking lot light and be detected?

We are given an equation:
[tex] (x+10)^{2} + (y-8)^{2} = 16[/tex]

This is an equation of a circle. General form of a circle equation is:
[tex] (x-a)^{2} + (y-b)^{2} = r^{2} [/tex]
Where:
a = x coordinate of a center
b = y coordinate of a center
r = radius of a circle

Motion detector can detect person anywhere within a boundary. The greatest distance at which detector can detect is at the edge of a circle. That distance, between detector and edge of circle, is equal to radius.

From the equation we have:
[tex]r^{2} =16 \\ r=4[/tex]
The greatest distance at which person can be detected is 4ft.

NewJack931 NewJack931 · Answer 2 · 2025-04-03T16:17:56-04:00

NewJack931 NewJack931

Today at 4:17 PM

Yes the correct answer is 4ft
because the radius of that circle is 4
(x+10)^2+(y−8)^2=4^2
Thanks Rodiak

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One of the parking lot lights at a hospital has a motion detector on it, and the equation (x+10)2+(y−8)2=16 describes the boundary within which motion can be sensed. What is the greatest distance, in feet, a person could be from the parking lot light and be detected?

Answer :

Other Questions

One of the parking lot lights at a hospital has a motion detector on it, and the equation (x+10)2+(y−8)2=16 describes the boundary within which motion can be sensed.

What is the greatest distance, in feet, a person could be from the parking lot light and be detected?