MCQMediumJEE 2026Argand Plane & Geometry

JEE Mathematics 2026 Question with Solution

Let zz be the complex number satisfying z53|z - 5| \le 3 and having maximum positive principal argument. Then 345z125iz+16234 \left| \frac{5z - 12}{5iz + 16} \right|^2 is equal to :

  • A

    1212

  • B

    1616

  • C

    2626

  • D

    2020

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: z53|z - 5| \le 3 represents a disk of radius 33 centered at (5,0)(5,0) in the complex plane.

Find: The value of 345z125iz+16234 \left| \frac{5z - 12}{5iz + 16} \right|^2 when zz has maximum positive principal argument.

For maximum argument, zz lies at the point of tangency of the line from the origin to the circle.

Let OO be the origin, C(5,0)C(5,0) the center, and PP the tangency point. In right triangle OPCOPC,

OP=OC2CP2=259=4OP = \sqrt{OC^2 - CP^2} = \sqrt{25 - 9} = 4

If θ\theta is the argument of zz, then

sinθ=CPOC=35,cosθ=OPOC=45\sin \theta = \frac{CP}{OC} = \frac{3}{5}, \qquad \cos \theta = \frac{OP}{OC} = \frac{4}{5}

Hence,

z=OP(cosθ+isinθ)=4(45+i35)=16+12i5z = OP(\cos \theta + i \sin \theta) = 4\left(\frac{4}{5} + i\frac{3}{5}\right) = \frac{16 + 12i}{5}

So,

5z=16+12i5z = 16 + 12i

Now substitute into the required expression:

E=34(16+12i)12i(16+12i)+162E = 34 \left| \frac{(16 + 12i) - 12}{i(16 + 12i) + 16} \right|^2 E=344+12i16i12+162=344+12i4+16i2E = 34 \left| \frac{4 + 12i}{16i - 12 + 16} \right|^2 = 34 \left| \frac{4 + 12i}{4 + 16i} \right|^2

Using ab2=a2b2\left|\frac{a}{b}\right|^2 = \frac{|a|^2}{|b|^2},

E=344+12i24+16i2=3416+14416+256=34160272E = 34 \frac{|4 + 12i|^2}{|4 + 16i|^2} = 34 \frac{16 + 144}{16 + 256} = 34 \frac{160}{272}

Since 272=8×34272 = 8 \times 34,

E=34×1608×34=1608=20E = \frac{34 \times 160}{8 \times 34} = \frac{160}{8} = 20

Therefore, the value is 2020. The correct option is D.

Geometric Interpretation

Given: The locus z53|z-5| \le 3 is a closed disk centered on the positive real axis.

Find: The extreme-point value of the given modulus expression.

The point with maximum positive principal argument on this disk is the tangency point from the origin to the boundary circle z5=3|z-5|=3. This is because rotating the ray from the origin counterclockwise, the last point of contact with the disk occurs at tangency.

From the right triangle formed by the origin, the center, and the tangency point,

OC=5,CP=3,OP=4OC = 5, \qquad CP = 3, \qquad OP = 4

Thus the tangency point has polar form

z=4(cosθ+isinθ)z = 4(\cos\theta + i\sin\theta)

with

cosθ=45,sinθ=35\cos\theta = \frac{4}{5}, \qquad \sin\theta = \frac{3}{5}

Therefore,

z=4(45+i35)=16+12i5z = 4\left(\frac{4}{5} + i\frac{3}{5}\right) = \frac{16+12i}{5}

Substituting this value of zz into the expression gives the required result:

345z125iz+162=344+12i4+16i2=2034 \left| \frac{5z - 12}{5iz + 16} \right|^2 = 34 \left| \frac{4+12i}{4+16i} \right|^2 = 20

Therefore, the value is 2020.

Common mistakes

  • Assuming the maximum argument occurs at the rightmost or topmost point of the circle is incorrect, because argument is the angle made with the positive real axis from the origin. The correct extreme point is the tangency point of the line from the origin to the circle.

  • Using z=5+3iz = 5 + 3i is wrong because that point does not lie on the circle in the direction of maximum argument from the origin. Instead, form the right triangle with center C(5,0)C(5,0) and radius 33 to determine the tangent point.

  • Substituting directly into the modulus expression without first computing 5z5z can lead to algebraic errors. It is cleaner to use 5z=16+12i5z = 16 + 12i and then simplify the numerator and denominator carefully.

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