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A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On one test model, the wheel placement (center) and radius are modeled by the equation (x + 2)^2 + (y - 1)^2 = 16. Which graph shows the position and radius of the wheels? thank you :)

A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On-example-1
A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On-example-1
A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On-example-2
User Katalin
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1 Answer

13 votes
13 votes

Solution:

Given:


(x+2)^^2+(y-1)^2=16

From the equation of a circle,


(x-h)^2+(y-k)^2=r^2

The following can be deduced when the two equations are compared.


\begin{gathered} h=-2 \\ k=1 \\ r^2=16 \\ r=√(16) \\ r=4 \\ \\ Hence,\text{ the center of the circle is at }(h,k)=(-2,1) \\ The\text{ radius of the circle is }r=4 \end{gathered}

Thus, the graph that has a radius of 4 and a center of (-2,1) is;

Therefore, the answer is ;

A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On-example-1
A manufacturer is designing a two-wheeled cart that can maneuver in tight spaces. On-example-2
User ZHAO Xudong
by
2.7k points