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Byju's Answer
Standard XII
Mathematics
Proof of LaGrange's Mean Value theorem
26. The circl...
Question
26. The circles each of radius 5, have a common tangent at (1,1) whose equation is 3x +4y-7 = 0. Then their centres are
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Similar questions
Q.
Two circles, each radius
5
, have a common tangent at
(
1
,
1
)
whose equation is
3
x
+
4
y
−
7
=
0
. Then their centre are:
Q.
Two circles, each of radius
5
, have a common tangent at
(
1
,
2
)
whose equation is
4
x
+
3
y
−
10
=
0
. Then their centres are
Q.
Two circles each of radius
5
units touch each other at
(
1
,
2
)
. If the equation of their common tangent is
4
x
+
3
y
=
10
, then the centres of the two circles, respectively, are
Q.
Find the equation of a circle whose centre is at
(
4
,
−
2
)
and
3
x
−
4
y
+
5
=
0
is tangent to circle.
Q.
If two circles of equal radii of
5
unit each, touch externally at
(
1
,
2
)
and the equation of one common tangent is
3
x
−
4
y
+
30
=
0
,
then the equations of the other two common tangents are
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