A circle is tangent to both lines 3x-4y+4=0 and 6x-8y-12=0 and to the x-axis. What is its area and the coordinates of its center?
If there is more than one such circle, find all areas and centers.
If there is more than one such circle, find all areas and centers.
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The distance from 3x-4y+4=0 and 6x-8y-12=0 (which is just 3x-4y-6=0) is |-6-4|/√(3²+(-4)²) which is 2, so the radius is 1 and the area is π.
The centres will be at the intersection of the midline (3x-4y-1=0) and y=1, and the intersection of the midline and y=-1. These centres are (5/3,1) and (-1,-1) respectively.
Graph: https://www.desmos.com/calculator/krbja0pboi
DWRead
tangent 1: y = ¾x+1
tangent 2: y = ¾x-1.5
The tangent lines are parallel and 2 units apart, so the radius of the circle is 1 and the area of the circle is π units².
Center of circle lies on the line parallel and equidistant to the tangents:
y = ¾x-0.25
Since the circle is tangent to the x-axis, the center lies on y=1 or y=-1.
If the center is on y=1 then
¾x-0.25 = 1
x = 5/3
center (5/3,1)
equation of circle:
(x-5/3)² + (y-1)² = 1
if the center is on y=-1 then
¾x-0.25 = -1
x = -1
center (-1,-1)
equation of circle:
(x+1)² + (y+1)² = 1
Pope
Two of the lines are parallel, so there are two congruent circles satisfying the conditions.
The two parallel lines:
3x - 4y + 4 = 0
3x - 4y - 6 = 0 ... This one has been simplified.
distance between the lines
= |4 - (-6)| / √(3² + 4²)
= 2
That is the diameter of the circle. Its radius is 1, and its area is π.
A third parallel line, equidistant from these two must include the center. Simply use the mean of the other two constant terms.
3x - 4y - 1 = 0
These are the two lines parallel to the x-axis and one unit from it:
y = -1
y = 1
The coordinates of the two centers are the solutions to these two systems:
3x - 4y - 1 = 0
y = -1
3x - 4(-1) - 1 = 0
x = -1
(-1, -1)
3x - 4y - 1 = 0
y = 1
3x - 4(1) - 1 = 0
x = 5/3
(5/3, 1)