find the co-ordinates
of the focus,
anis of the equation
equation of of y2= 8x
Answers
Answer:
From the question we can get,
Equation of the parabola y
2
=−4ax
Since the coefficient of x is negative the curve is open towards left.
Coordinates of focus is (-a, 0)
Length of the latus rectum is 4a.
Equation of directrix is x-a = 0
The given equation is y
2
=−8x
Comparing this equation with y
2
=−4ax
4a=8
a=2
Hence the coordinates of focus are (-2,0)
Since the given equation involves y
2
, the axis of the parabola is x-axis.
Axis : x-axis
Equation of the directrix : x=a i.e.x=2
Length of the latus rectum :4a=4×2=8
Answer:
From the question we can get,
Equation of the parabola y
2
=−4ax
Since the coefficient of x is negative the curve is open towards left.
Coordinates of focus is (-a, 0)
Length of the latus rectum is 4a.
Equation of directrix is x-a = 0
The given equation is y
2
=−8x
Comparing this equation with y
2
=−4ax
4a=8
a=2
Hence the coordinates of focus are (-2,0)
Since the given equation involves y
2
, the axis of the parabola is x-axis.
Axis : x-axis
Equation of the directrix : x=a i.e.x=2
Length of the latus rectum :4a=4×2=8