MCQMediumJEE 2024Straight Line Equations

JEE Mathematics 2024 Question with Solution

Let a variable line passing through the center of the circle x2+y216x4y=0x^2 + y^2 - 16x - 4y = 0 meet the positive coordinate axes at points A and B. The minimum value of OA + OB, where O is the origin, is:

  • A

    1212

  • B

    1818

  • C

    2020

  • D

    2424

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The circle is

x2+y216x4y=0x^2 + y^2 - 16x - 4y = 0

and the variable line passes through its center.

Find: The minimum value of OA+OBOA + OB where the line meets the positive coordinate axes at A and B.

First rewrite the circle in standard form:

(x8)2+(y2)2=68(x - 8)^2 + (y - 2)^2 = 68

So the center is (8,2)(8,2).

Let the line through (8,2)(8,2) be

y2=m(x8)y - 2 = m(x - 8)

For the x-intercept, put y=0y = 0:

2=m(x8)-2 = m(x - 8) x=2m+8x = -\frac{2}{m} + 8

For the y-intercept, put x=0x = 0:

y2=8my - 2 = -8m y=8m+2y = -8m + 2

Hence,

OA+OB=2m+8+8m+2OA + OB = \left|-\frac{2}{m} + 8\right| + \left|-8m + 2\right|

From the extracted solution, for the line to meet the positive axes and for the required minimum, we take

f(m)=2m+88m+2f(m) = -\frac{2}{m} + 8 - 8m + 2

Then

f(m)=2m28f'(m) = \frac{2}{m^2} - 8

Setting f(m)=0f'(m)=0,

2m28=0\frac{2}{m^2} - 8 = 0 m2=14m^2 = \frac{1}{4}

So

m=12m = -\frac{1}{2}

Substituting,

f(12)=18f\left(-\frac{1}{2}\right) = 18

Therefore, the minimum value of OA+OBOA + OB is 1818. Hence the correct option is B.

Note: The answer key says option C (20), but the solution concludes option B (18). the answer is taken as B.

Common mistakes

  • Ignoring that the line meets the positive coordinate axes. This changes the sign conditions on the intercepts. Use intercepts that are positive and handle the modulus terms carefully.

  • Finding the center incorrectly by not completing the square properly. The correct center of the circle is (8,2)(8,2), not (8,2)(-8,-2).

  • Differentiating 2m-\frac{2}{m} incorrectly. Its derivative is 2m2\frac{2}{m^2}, not 2m2-\frac{2}{m^2}. A sign error gives the wrong critical point.

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