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The asymptotes of a hyperbola are lines that:
Pass through the foci
Pass through the center and approach the branches
Are parallel to the x-axis
The asymptotes of a hyperbola are:
Parallel to the x-axis
Parallel to the major axis
Lines that pass through the center and approach the branches
The equations of the asymptotes of a hyperbola are given by:
y=mx+b
y=mx
x=y
If the equation of a hyperbola is 9x2 -25y2=1, what are the slopes of the asymptotes?
35 and −35
259 and −259
925 and −925
The asymptotes of a hyperbola are determined by the:
Slope of the major axis
Slope of the minor axis
Ratio of the conjugate axis to the transverse axis
Fill in the blank
Asymptotes of hyperbola are the lines that pass through __________ of the hyperbola
Center
conic
None
The slopes of the asymptotes of a hyperbola are determined by the ratio of:
Major axis to minor axis
Transverse axis to conjugate axis
Vertical axis to horizontal axis
What are the asymptotes of a hyperbola?
Vertical lines passing through the center
Lines parallel to the transverse axis
Lines that approach the branches of the hyperbola
For a hyperbola with equation 36x2 - 49y2=1,what are the equations of the asymptotes?
y=67x and y=−67x
y=76x and y=−76x
y=36x and y=−36x
The slopes of the asymptotes of a hyperbola are:
Always positive
Always negative
Determined by the ratio of the conjugate axis to the transverse axis
It is done.