Two circles, each of radius 5, have a common tangent at (1, 1) whose equation is `3x+4y-7=0`. Then their centres, are

Two circles, each of radius 5 have a common tangent at (1,1), whose equation is 4x+3y-7=0 , show that the centres are (5,4) and (-3,-2).

Two circles, each of radius 5 units, touch each other at (1, 2). If the equation of their common tangents is 4x+3y=10 , find the equations of the circles.

Two circles, each of radius 5 units, touch each other at (1, 2). If the equation of their common tangent is 4x + 3y = 10, find the equations of the circles.

Two circles, each of radius 5 units, touch each other at (1, 2). If the equation of their common tangents is 4x+3y=10 , find the equations of the circles.

Two circles,each of radius 5 units,touch each other at (1,2). If the equation of their common tangents is 4x+3y=10, find the equations of the circles.

Two circles each of radius 5 units touch each other at the point (1, 2). If the equation of their common tangent is 4x+3y=10 , and C_(1)(alpha, beta) and C_(2)(gamma, delta), C_(1) ne C_(2) are their centres, then |(alpha+beta) (gamma+delta)| is equal to _______.

Two circles each of radius 5 units touch each at (1, 2) If the equation of their common tangent is 4x + 3y = 10, find the equations of the two circles.