Question 58403: write an equation for the ellipse that satisfies each set of conditions.
endpoints of major axis at (-9,0) and (9,0), endpoints of minor axis at (0,3) and (0,-3).
I got x2/9+y2/81=1 is this right?
Answer by Edwin McCravy(20056)   (Show Source):
You can put this solution on YOUR website! write an equation for the
ellipse that satisfies each set of conditions.
endpoints of major axis at (-9,0) and (9,0),
endpoints of minor axis at (0,3) and (0,-3).
Its center is at the origin because (0,0) is halfway
between both the endpoints of the major axis as well
as halfway between both endpoints of the minor axis,
therefore the equation is either of the form
x² y²
---- + ---- = 1
a² b²
if it is fatter than it is tall, that is, like
an egg lying on a table,
or
x² y²
---- + ---- = 1
b² a²
if it is taller than it is fat, that is, like
the numeral zero, 0.
Obviously this one is like an egg lying on a table.
a = half the major axis
b = half the minor axis
the distance between (-9,0) and (9,0) is 18 and
the distance between (-3,0) and (3,0) is 6
so a = 9 and b = 3
So the equation is
x² y²
---- + ---- = 1
a² b²
or
x² y²
---- + ---- = 1
9² 3²
or
x² y²
---- + ---- = 1
81 9
Its graph is:
Edwin
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