NVAMediumJEE 2023Circle Equation & Properties

JEE Mathematics 2023 Question with Solution

Two circles in the first quadrant of radii r1r_1 and r2r_2 touch the coordinate axes. Each of them cuts off an intercept of 22 units with the line x+y=2x + y = 2. Then r12+r22r1r2r_1^2 + r_2^2 - r_1r_2 is equal to:

Answer

Correct answer:7

Step-by-step solution

Standard Method

Given: Two circles in the first quadrant touch both coordinate axes, so their centres are of the form (a,a)(a,a) and radius is aa.

Find: The value of r12+r22r1r2 r_1^2 + r_2^2 - r_1 r_2 when each circle cuts off an intercept of 22 units on the line $$ x+y=2

The equation of such a circle is

(xa)2+(ya)2=a2(x-a)^2+(y-a)^2=a^2

Expanding,

x2+y22ax2ay+a2=0x^2+y^2-2ax-2ay+a^2=0

The chord cut by the line x+y=2 x+y=2 has length 22. For a circle of radius aa, chord length is

2a2d2=22\sqrt{a^2-d^2}=2

where dd is the perpendicular distance from the centre $$ (a,a)

Now,

d=a+a22=2a22d=\frac{|a+a-2|}{\sqrt{2}}=\frac{|2a-2|}{\sqrt{2}}

Substituting into the chord formula,

2a2(2a22)2=22\sqrt{a^2-\left(\frac{2a-2}{\sqrt{2}}\right)^2}=2

Squaring both sides,

a2(2a2)22=1a^2-\frac{(2a-2)^2}{2}=1

Simplifying,

2a2(2a2)2=22a^2-(2a-2)^2=2 2a2(4a28a+4)=22a^2-(4a^2-8a+4)=2 2a2+8a4=2-2a^2+8a-4=2 2a2+8a6=0-2a^2+8a-6=0

Dividing by 2-2,

a24a+3=0a^2-4a+3=0

Thus,

(a1)(a3)=0(a-1)(a-3)=0

So the two possible radii are

r1=1,r2=3r_1=1,\quad r_2=3

Therefore,

r1+r2=4,r1r2=3r_1+r_2=4,\quad r_1r_2=3

Hence,

r12+r22r1r2=(r1+r2)23r1r2=4233=169=7r_1^2+r_2^2-r_1r_2=(r_1+r_2)^2-3r_1r_2=4^2-3\cdot 3=16-9=7

Therefore, the required value is 77.

Geometric Shortcut

Given: The circle touches both axes, so its centre is (r,r)(r,r) and radius is rr.

Find: The possible radii and then compute $$ r_1^2+r_2^2-r_1r_2

A circle in the first quadrant touching both axes, with centre marked O at (r, r), and a slanted line x plus y equals 2 cutting the circle through points A and B.Handwritten derivation showing AB equals 1, OA equals square root of r squared minus 1, leading to the quadratic r squared minus 4r plus 3 equals 0 and final value 7.

From the geometry shown, half of the intercepted chord is taken as AB=1AB=1, so in the right triangle,

OA=r21OA=\sqrt{r^2-1}

The perpendicular distance from (r,r)(r,r) to the line $$ x+y=2

\frac{|2r-2|}{\sqrt{2}}

Hence,Hence,

\frac{|2r-2|}{\sqrt{2}}=\sqrt{r^2-1}

Squaring,Squaring,

2(r-1)^2=r^2-1

2r^2-4r+2=r^2-1

r^2-4r+3=0

So,So,

(r-1)(r-3)=0

Thus the radii are $$ 1 $$ and $$ 3 $$. Therefore,

r_1^2+r_2^2-r_1r_2=1+9-3=7

So the required value is **$$7$$**.

Common mistakes

  • Assuming the centre is arbitrary in the first quadrant is incorrect. Since the circle touches both coordinate axes, the centre must be $$ (r,r)

  • Using the full intercept length directly as the half-chord in the right triangle is wrong. If the intercept is 22, then the half-chord used in the radius-distance formula is 11.

  • Making an error in the perpendicular distance formula to the line x+y2=0 x+y-2=0 leads to the wrong quadratic. The correct distance from (r,r)(r,r) is $$ \frac{|2r-2|}{\sqrt{2}}

Practice more Circle Equation & Properties questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions