Obtaining Centre and Radius of a Circle from General Equation of a Circle
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A square is inscribed in the circle x2+y2−6x+8y−103=0 with its sides parallel to the coordinate axes. Then the distance of the vertex of this square which is nearest to the origin is:
- 6
- √41
- 13
- √137
- 13
- 20
- 25
- −25
- x2+y2+2x+2y=0
- x2+y2−x−y=0
- x2+y2+x+y=0
- x2+y2−2x−2y=0
If 2x2+λxy+2y2+(λ−4)x+6y−5=0
is the equation of a circle, then its radius is
3√2
2√2
None of these
2√3
If the equation (4a−3)x2+ay2+6x−2y+2=0 represents a circle, then its centre is
(3, -1)
(3, 1)
(-3, -1)
None of these
The area (in sq. units) of the part of the circle , which is outside the parabola , is:
- None of these
- x-axis at the origin
- x2+y2+2x+2y=1
- x2+y2+2x=1
- x2+y2+2y=1
- x2+y2=1
If the circles x2+y2=a and x2+y2−6x−8y+9=0, touch externally, then a=
1
-1
21
16
If a chord of the circle x2+y2−4x−2y−c=0 is trisected at the points (1/3, 1/3) and (8/3, 8/3), then
Length of the chord=7√2
c=20
Radius of the circle 25
c=25
- 347
- 4
- -4
- 49
- πa2
- 2πa2
- 4πa2
- 12πa2
- (14, 0)and14
- (−12, 0)and12
- (12, 0)and12
- (0, −14)and14
The coordinates of the centre of a circle, whose radius is 2 units and which touches the line pair x2−y2−2x+1=0, are
- (4, 0)
- (1+2√2, 0)
- (4, 1)
- (1, 2√2)
The area of an equilateral triangle inscribed in the circle x2+y2−6x−8y−25=0 is
25π
None of these
225√36
50π−100
(1, 4) and (3, 8) are the end points of diameter of a circle. Find the radius and center of this circle.
2√5 and (2, 6)
√5 and (2, 6)
√5 and (6, 2)
2√5 and (6, 2)
Find the coordinates of the centre and radius of each of the following circles :
(i) x2+y2+6x−8y−24=0
(ii) 2x2+2y2−3x+5y=7
(iii) 12(x2+y2)+x cosθ+ysinθ−4=0.
(iv) x2+y2−ax−by=0
- 3x – y = 0, x + 3y = 0
- 3x + y = 0, x – 3y = 0
- 3x + y = 0, x + 3y = 0
- 3x – y = 0, x – 3y = 0
If the circles x2+y2=9 and x2+y2++8y+c=0
touch each other, then c is equal to
-15
-16
16
15
Prove that the radii of the circles
x2+y2=1, x2+y2−2x−6y−6=0
and x2+y2−4x−12y−9=0 are in A.P
- -4
- 4
- \N
- 1
The equation x2+y2+2x−4y×5=0 represents
none of these
a point
a circle of non-zero radius
a pair of straight lines
The radius of the circle representd by the equation 3x2+3y2+λxy+9x+(λ−6)y+3=0
None of these
32
√172
23
If (-3, 2) lies on the circle x2+y2+2gx+2fy+c=0 which is concentric with the circle x2+y2+6x+8y−5=0, then c=
11
24
None of these
-11