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JEE Mathematics 2024 Question with Solution

The portion of the line 4x+5y=204x + 5y = 20 in the first quadrant is trisected by lines L1L_1 and L2L_2 passing through the origin. The tangent of the angle between L1L_1 and L2L_2 is:

  • A

    85\frac{8}{5}

  • B

    2541\frac{25}{41}

  • C

    25\frac{2}{5}

  • D

    3041\frac{30}{41}

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The line segment of 4x+5y=204x + 5y = 20 lying in the first quadrant is trisected by lines L1L_1 and L2L_2 drawn from the origin.

Find: The tangent of the angle between L1L_1 and L2L_2.

First find the intercepts of the line on the coordinate axes:

y=04x=20x=5x=05y=20y=4\begin{aligned} y &= 0 \Rightarrow 4x = 20 \Rightarrow x = 5 \\ x &= 0 \Rightarrow 5y = 20 \Rightarrow y = 4 \end{aligned}

So the relevant segment joins $$ (5,0) \text{ and } (0,4)

The trisection points divide the segment in the ratios 1:21:2 and 2:12:1. Using section formula:

(10+251+2,14+201+2)=(103,43)\left(\frac{1\cdot 0 + 2\cdot 5}{1+2}, \frac{1\cdot 4 + 2\cdot 0}{1+2}\right) = \left(\frac{10}{3}, \frac{4}{3}\right)

and

(20+152+1,24+102+1)=(53,83)\left(\frac{2\cdot 0 + 1\cdot 5}{2+1}, \frac{2\cdot 4 + 1\cdot 0}{2+1}\right) = \left(\frac{5}{3}, \frac{8}{3}\right)

Using Slopes of the Two Lines

Since both lines pass through the origin, their slopes are obtained from the trisection points:

m1=43103=25,m2=8353=85m_1 = \frac{\frac{4}{3}}{\frac{10}{3}} = \frac{2}{5}, \qquad m_2 = \frac{\frac{8}{3}}{\frac{5}{3}} = \frac{8}{5}

Now use the formula for angle between two lines:

tanθ=m2m11+m1m2\tan\theta = \left|\frac{m_2 - m_1}{1 + m_1m_2}\right|

Substituting the values,

tanθ=85251+2585=651+1625=654125=3041\tan\theta = \left|\frac{\frac{8}{5} - \frac{2}{5}}{1 + \frac{2}{5}\cdot\frac{8}{5}}\right| = \left|\frac{\frac{6}{5}}{1 + \frac{16}{25}}\right| = \left|\frac{\frac{6}{5}}{\frac{41}{25}}\right| = \frac{30}{41}

Therefore, the tangent of the angle between L1L_1 and L2L_2 is 3041\frac{30}{41}. Hence, the correct option is D.

Common mistakes

  • Using the intercepts (5,0)(5,0) and (0,4)(0,4) directly as the required points is incorrect because L1L_1 and L2L_2 pass through the trisection points of the segment, not the endpoints. First find the two internal trisection points, then form the lines from the origin.

  • Applying the section formula with reversed ratios can interchange the two trisection points. Although the final angle remains the same, the slopes get swapped. Write both ratios carefully as 1:21:2 and 2:12:1 before substitution.

  • Using the wrong formula for angle between lines, such as m2m11m1m2\frac{m_2-m_1}{1-m_1m_2}, is incorrect here. For the tangent of the angle between two lines, use tanθ=m2m11+m1m2\tan\theta = \left|\frac{m_2-m_1}{1+m_1m_2}\right|.

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