What is the equation of the chord centered at (1, 2) in the circle x2 + y2 − 4x − 6y − 10 = 0
What is the equation of the chord centered at (1, 2) in the circle x2 + y2 − 4x − 6y − 10 = 0
The correct option is C x +y − 3 = 0
This can be solved in 2 methods.
Method - 1
Given circle is
, x2 + y2 − 4x − 6y − 10 = 0
(x − 2)2 + (y − 3)2 = 10 + 9 + 4
= 23
This is shown in the figure. P is the given point and O is the centre of the circle.
Also AB is the required chord.
Slope of PO=3−22−1=1
∴ slope of AB = −1, because AB ⊥ OP.
∴ Required equation of AB is,
y − 2 =(−1) (x − 1) = 0
i.e., y − 2 = −x + 1
i.e., x + y − 3 =0
Method 2
In this we use the formula to find the equation of the chord.
→ T1 = S1
Where T1 is obtained by replacing
x2 by xx1, y2 by yy1, x by (x+x12),y by (y+y12)
S1 is obtained by replacing x by x1 and y by y1.
∴ T1 = S1
x + 2y − 2(x + 1) − 3(y + 2) − 10 = 1 + 4 − 4 − 12 − 10
− x − y − 8 = −11
i.e., x + y − 3 = 0
x +y − 3 = 0
This can be solved in 2 methods.
Method - 1
Given circle is
, x2 + y2 − 4x − 6y − 10 = 0
(x − 2)2 + (y − 3)2 = 10 + 9 + 4
= 23
This is shown in the figure. P is the given point and O is the centre of the circle.
Also AB is the required chord.
Slope of PO=3−22−1=1
∴ slope of AB = −1, because AB ⊥ OP.
∴ Required equation of AB is,
y − 2 =(−1) (x − 1) = 0
i.e., y − 2 = −x + 1
i.e., x + y − 3 =0
Method 2
In this we use the formula to find the equation of the chord.
→ T1 = S1
Where T1 is obtained by replacing
x2 by xx1, y2 by yy1, x by (x+x12),y by (y+y12)
S1 is obtained by replacing x by x1 and y by y1.
∴ T1 = S1
x + 2y − 2(x + 1) − 3(y + 2) − 10 = 1 + 4 − 4 − 12 − 10
− x − y − 8 = −11
i.e., x + y − 3 = 0
