If the circle `C_1: x^2 + y^2 = 16` intersects another circle `C_2` of radius `5` in such a manner that,the common chord is of maximum length and has a slope equal to `3/4`, then the co-ordinates of the centre of `C_2` are:

If the circle C_(1),x^(2)+y^(2)=16 intersects another circle C_(2) of radius 5 in such a manner that the common chord is of maximum length and has a slope equal to (3/4), find the coordinates of centre C_(2) .

If the circle C1: x^2+y^2=16 intersect another circle C2 of radius 5 in such a way that common chord is of maximum length and has a slope equal to 3/4, then coordinates of the centre of C2 is: a. (9/5,12/5) b. (9/5,-12/5) c. (-9/5,-12/5) d. (-9/5,12/5)

If a circle C_(1),x^(2)+y^(2)=16 intersects another circle C_(2) of radius 5 in such a manner that the common chord is maximum length and has slope 3/4 , then show the centres of C_(2) are (9/5,(-12)/5),((-9)/5,12/5)

If the circle (x-a)^2+y^2=25 intersects the circle x^2+(y-b)^2=16 in such a way that common chord is of maximum length, then value of a^2+b^2 is

If the circle C_(2) of radius 5 intersects othe circle C_(1):x^(2)+y^(2)=16 such that the common chord is in maximum length and its slope is (3)/(4) , then the centre of C_(2) will be-

If the circle (x-a)^(2)+y^(2)=25 intersect the circle x^(2)+(y-b)^(2)=16 in such a way that common chord is of maximum length,then value of a^(2)+b^(2) is

Circles of radius 5 units intersects the circle (x-1)^(2)+(x-2)^(2)=9 in a such a way that the length of the common chord is of maximum length. If the slope of common chord is (3)/(4) , then find the centre of the circle.