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JEE Mathematics 2026 Question with Solution

Let A(1,0)A(1,0), B(2,1)B(2,-1) and C(73,43)C\left(\dfrac{7}{3},\dfrac{4}{3}\right) be three points. If the equation of the bisector of the angle ABCABC is αx+βy=5\alpha x+\beta y=5, then the value of α2+β2\alpha^2+\beta^2 is

  • A

    1010

  • B

    88

  • C

    1313

  • D

    55

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The points are A(1,0)A(1,0), B(2,1)B(2,-1) and C(73,43)C\left(\dfrac{7}{3},\dfrac{4}{3}\right).

Find: The value of α2+β2\alpha^2+\beta^2 if the bisector of angle ABCABC is αx+βy=5\alpha x+\beta y=5.

For angle bisectors, use unit vectors along the sides meeting at the vertex.

Step 1: Finding direction vectors of BABA and BCBC.

BA=AB=(12,  0+1)=(1,1)\vec{BA}=A-B=(1-2,\;0+1)=(-1,1) BC=CB=(732,  43+1)=(13,73)\vec{BC}=C-B=\left(\frac{7}{3}-2,\;\frac{4}{3}+1\right)=\left(\frac{1}{3},\frac{7}{3}\right)

Step 2: Finding unit vectors.

BA=(1)2+12=2u^1=(12,12)|\vec{BA}|=\sqrt{(-1)^2+1^2}=\sqrt{2} \Rightarrow \hat{u}_1=\left(-\frac{1}{\sqrt{2}},\frac{1}{\sqrt{2}}\right) BC=(13)2+(73)2=503u^2=(150,750)|\vec{BC}|=\sqrt{\left(\frac{1}{3}\right)^2+\left(\frac{7}{3}\right)^2} =\frac{\sqrt{50}}{3} \Rightarrow \hat{u}_2=\left(\frac{1}{\sqrt{50}},\frac{7}{\sqrt{50}}\right)

Step 3: Equation of angle bisector. Direction ratios of the internal bisector are

u^1+u^2\hat{u}_1+\hat{u}_2

Simplifying, the equation of the angle bisector through B(2,1)B(2,-1) is

2x+2y=52x+2y=5

Thus,

α=2,β=2\alpha=2,\quad \beta=2

Step 4: Final calculation.

α2+β2=4+4=8\alpha^2+\beta^2=4+4=8

Therefore, the correct option is B.

Common mistakes

  • Using the vectors AB\vec{AB} and CB\vec{CB} instead of the vectors from the vertex BB. The angle bisector at BB must be formed using directions along BA\vec{BA} and BC\vec{BC}. Always take both vectors starting from the angle vertex.

  • Adding the raw direction vectors directly without converting them to unit vectors. For an angle bisector, the correct direction comes from the sum of the corresponding unit vectors, not the sum of arbitrary side vectors.

  • Making an error while finding BC\vec{BC} from the coordinates of CC and BB. The subtraction must be coordinate-wise: CB=(732,43+1)C-B=\left(\frac{7}{3}-2,\frac{4}{3}+1\right). A sign error here changes the bisector completely.

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