Equation of the line passing through the mid-point of intercepts made by the circle x2 + y2 − 17x − 16y + 60 = 0 is
Equation of the line passing through the mid-point of intercepts made by the circle x2 + y2 − 17x − 16y + 60 = 0 is
The correct option is B 16x + 17y = 136
Method 1:
we will first find the points where the given circle intersect the coordinate axes .To find those points ,we
will put y=0 and x=0 seperately.
To find the x-coordinate
x2 + y2 − 17x − 16y + 60 = 0 is the equation of given circle.
when the circle intersects the x-axis ,y-coordinate will be zero.
⇒ x2 − 17x + 60 = 0
⇒ (x−12)(x−5) = 0
⇒ x=5 or x=12
so the points where it intersects x-axis are (5,0) and (12,0)
⇒ The mid-point ≡ (12+52,0)
=(172,0)
To find the y-coordinate
when the circle intersects the y -axis ,the x-coordinate will be zero.
⇒ y2 − 16y + 60 = 0
⇒ (y−10)(y−6)=0
⇒ y=10 or y=6
so the points are (0,10) and (0,6) and the mid-point is (0,10+62) ≡ (0,8) we found that the mid-points
are (172,0) and (0,8).we will now find the equation of the straight line passing these points
⇒ x172 + y8 = 1 or 2x17 + y8 = 1
⇒ 16x + 17y = 136
16x + 17y = 136
Method 1:
we will first find the points where the given circle intersect the coordinate axes .To find those points ,we
will put y=0 and x=0 seperately.
To find the x-coordinate
x2 + y2 − 17x − 16y + 60 = 0 is the equation of given circle.
when the circle intersects the x-axis ,y-coordinate will be zero.
⇒ x2 − 17x + 60 = 0
⇒ (x−12)(x−5) = 0
⇒ x=5 or x=12
so the points where it intersects x-axis are (5,0) and (12,0)
⇒ The mid-point ≡ (12+52,0)
=(172,0)
To find the y-coordinate
when the circle intersects the y -axis ,the x-coordinate will be zero.
⇒ y2 − 16y + 60 = 0
⇒ (y−10)(y−6)=0
⇒ y=10 or y=6
so the points are (0,10) and (0,6) and the mid-point is (0,10+62) ≡ (0,8) we found that the mid-points
are (172,0) and (0,8).we will now find the equation of the straight line passing these points
⇒ x172 + y8 = 1 or 2x17 + y8 = 1
⇒ 16x + 17y = 136
