Answer: The standard form for the equation of an ellipse is:
(
x
β
h
)
2
a
2
+
(
y
β
k
)
2
b
2
=
1
The center is:
(
h
,
k
)
The vertices on the major axis are:
(
h
β
a
,
k
)
and
(
h
+
a
,
k
)
The vertices on the minor axis are:
(
h
,
k
β
b
)
and
(
h
,
k
+
b
)
The foci are:
(
h
β
β
a
2
β
b
2
,
k
)
and
(
h
+
β
a
2
β
b
2
,
k
)
To put the given equation in standard form, change the + 2 to - -2 and write the denominators as squares:
(
x
β
3
)
2
4
2
+
(
y
β
β
2
)
2
3
2
=
1
The center is:
(
3
,
β
2
)
The vertices on the major axis are:
(
β
1
,
β
2
)
and
(
7
,
β
2
)
The vertices on the minor axis are:
(
3
,
β
5
)
and
(
3
,
1
)
Evaluate:
β
a
2
β
b
2
=
β
4
2
β
3
2
=
β
16
β
9
=
β
5
The foci are:
(
3
β
β
5
,
β
2
)
and
(
3
+
β
5
,
β
2
)
