wiz-icon
MyQuestionIcon
MyQuestionIcon
1
You visited us 1 times! Enjoying our articles? Unlock Full Access!
Question

Let P(a,b) be a point in the first quadrant. Circles are drawn through P touching the coordinate axes such that the length of common chord for the smaller circle is maximum. If possible values of ab is k1 and k2, then k1+k2 is equal to

Open in App
Solution

Let r1,r2 (r1<r2) be the radii of the circles.
Since the two circles touch the coordinate axes,
Equations will be of the form x2+y22r(x+y)+r2=0
Since it passes through P(a,b),
a2+b22r(a+b)+r2=0
which is a quadratic equation in r.
r1=a+b2ab, r2=a+b+2ab

Now, the common chord equation is
S1S2=0x+y=a+b
For maximum length of common chord, common chord becomes diameter of the smaller circle,
i.e., (a+b2ab,a+b2ab) should lie on the common chord.
Putting the coordinates in chord equation, we get a+b=22ab
a2+b2=6ab
Dividing LHS and RHS by b2,
(ab)2+1=6(ab)
(ab)26(ab)+1=0
So, from sum of the roots of quadratic equation
k1+k2=6

flag
Suggest Corrections
thumbs-up
5
Join BYJU'S Learning Program
Join BYJU'S Learning Program
CrossIcon