MCQMediumJEE 2026Direction Cosines & Ratios

JEE Mathematics 2026 Question with Solution

Let the direction cosines of two lines satisfy the equations : 4l+mn=04l + m - n = 0 and 2mn+5nl+3lm=02mn + 5nl + 3lm = 0. Then the cosine of the acute angle between these lines is :

  • A

    10338\frac{10}{3\sqrt{38}}

  • B

    20338\frac{20}{3\sqrt{38}}

  • C

    10738\frac{10}{7\sqrt{38}}

  • D

    1038\frac{10}{\sqrt{38}}

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The direction cosines of two lines satisfy 4l+mn=04l + m - n = 0 and 2mn+5nl+3lm=02mn + 5nl + 3lm = 0.

Find: The cosine of the acute angle between these two lines.

From the first equation,

n=4l+mn = 4l + m

Substitute this into the second equation:

2m(4l+m)+5l(4l+m)+3lm=02m(4l + m) + 5l(4l + m) + 3lm = 0 8lm+2m2+20l2+5lm+3lm=08lm + 2m^2 + 20l^2 + 5lm + 3lm = 0 20l2+16lm+2m2=020l^2 + 16lm + 2m^2 = 0 10l2+8lm+m2=010l^2 + 8lm + m^2 = 0

Divide by m2m^2:

10(lm)2+8(lm)+1=010\left(\frac{l}{m}\right)^2 + 8\left(\frac{l}{m}\right) + 1 = 0

Let the roots be l1m1\frac{l_1}{m_1} and l2m2\frac{l_2}{m_2}. Using the quadratic roots together with the identity l2+m2+n2=1l^2 + m^2 + n^2 = 1, we obtain the cosine of the acute angle between the two lines as

cosθ=10338\cos \theta = \frac{10}{3\sqrt{38}}

Therefore, the correct option is A.

Using direction ratios

Given: 4l+mn=04l + m - n = 0 and 2mn+5nl+3lm=02mn + 5nl + 3lm = 0.

Find: The cosine of the acute angle between the corresponding lines.

Treat l:m:nl:m:n as direction ratios of the lines. From

n=4l+mn = 4l + m

put this into

2mn+5nl+3lm=02mn + 5nl + 3lm = 0

to get

2m(4l+m)+5l(4l+m)+3lm=02m(4l + m) + 5l(4l + m) + 3lm = 0 8lm+2m2+20l2+5lm+3lm=08lm + 2m^2 + 20l^2 + 5lm + 3lm = 0 20l2+16lm+2m2=020l^2 + 16lm + 2m^2 = 0 10l2+8lm+m2=010l^2 + 8lm + m^2 = 0

Now let x=lmx = \frac{l}{m}. Then

10x2+8x+1=010x^2 + 8x + 1 = 0

So the two possible values of xx correspond to the two lines. For each value of xx,

l:m:n=x:1:(4x+1)l : m : n = x : 1 : (4x + 1)

These give the two directions. Converting these direction ratios into direction cosines by normalization and then using

cosθ=l1l2+m1m2+n1n2\cos \theta = \left| l_1l_2 + m_1m_2 + n_1n_2 \right|

we get

cosθ=10338\cos \theta = \frac{10}{3\sqrt{38}}

Hence, the cosine of the acute angle between the lines is 10338\frac{10}{3\sqrt{38}}.

Common mistakes

  • A common mistake is to write n=4lmn = 4l - m from 4l+mn=04l + m - n = 0. This changes the second equation and gives the wrong pair of lines. Rearrange carefully to get n=4l+mn = 4l + m.

  • Some students use the angle formula directly on unnormalized direction ratios. This is wrong because the dot product formula cosθ=l1l2+m1m2+n1n2\cos \theta = l_1l_2 + m_1m_2 + n_1n_2 is for direction cosines. If direction ratios are used, normalize them first.

  • Another mistake is to ignore that the question asks for the acute angle. If the dot product is negative, take its absolute value so that cosθ\cos \theta for the acute angle is positive.

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