Asked by Loubs
Sketch the Graph of x^2=y^2=9
Answers
Answered by
Reiny
x^2=y^2=9
x^2 - y^2=9
x^2 /9 - y^2 / 9 = 1
You have a hyperbola with centre (0,0) and a=3, and b=3
vertices are (3,0) and (-3,0)
draw a square with sides 6 and centre it at the origin
draw the diagonals of this square and extend them in all four directions.
These two extended diagonal are the asymptotes of your hyperbola
Sketch your two parts of the hyperbola with centres given above and approaching these asymptotes
x^2 - y^2=9
x^2 /9 - y^2 / 9 = 1
You have a hyperbola with centre (0,0) and a=3, and b=3
vertices are (3,0) and (-3,0)
draw a square with sides 6 and centre it at the origin
draw the diagonals of this square and extend them in all four directions.
These two extended diagonal are the asymptotes of your hyperbola
Sketch your two parts of the hyperbola with centres given above and approaching these asymptotes
Answered by
coni
Find the equation of a hyperbola which is generated by a point that moves so that the difference of its distance from the points (-4,1) and (2,1) is 4.
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