The graph is attached.
Answer:
(-2.2, 4) and (8.2, 4)
Step-by-step explanation:
In an ellipse, there is a minor radius and a major radius.
Let major radius be = a
Let minor radius be= b
From the graph, we are given:
Major radius, a = 6
Minor radius, b = 3
Now, let's find the distance from the center to the focus using the formula:
[tex] \sqrt{a^2 - b^2} [/tex]
Substituting values, we have:
[tex]= \sqrt{6^2 - 3^2} [/tex]
[tex] = \sqrt{36 - 9} [/tex]
[tex] = \sqrt{27} = 5.916 [/tex]
≈ 5.2
We can see from the graph that center coordinate is (3, 4). Therefore, the approximate locations of the foci of the ellipse would be:
(3-5.2, 4) and (3+5.2, 4)
= (-2.2, 4) and (8.2, 4)
