MCQMediumJEE 2024Functions

JEE Mathematics 2024 Question with Solution

If the domain of the function f(x)=cos1(2x4)f(x) = \cos^{-1}\left(\frac{2 - |x|}{4}\right) is [α,β){γ}[-\alpha, \beta) - \{\gamma\}, then α+β+γ\alpha + \beta + \gamma is equal to:](streamdown:incomplete-link)

  • A

    1212

  • B

    99

  • C

    1111

  • D

    88

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: f(x)=cos1(2x4)+(loge(3x))1f(x) = \cos^{-1}\left(\frac{2 - |x|}{4}\right) + \left(\log_e(3-x)\right)^{-1}

Find: The value of α+β+γ\alpha + \beta + \gamma if the domain is [α,β){γ}[-\alpha, \beta) - \{\gamma\}.

For cos1(2x4)\cos^{-1}\left(\frac{2 - |x|}{4}\right) to be defined, its argument must satisfy

12x41-1 \leq \frac{2 - |x|}{4} \leq 1

This gives

42x4-4 \leq 2 - |x| \leq 4

From the left inequality,

42xx6-4 \leq 2 - |x| \Rightarrow |x| \leq 6

so

6x6-6 \leq x \leq 6

For (loge(3x))1\left(\log_e(3-x)\right)^{-1} to be defined, we need

3x>0x<33-x > 0 \Rightarrow x < 3

and also

loge(3x)0\log_e(3-x) \neq 0

which implies

3x1x23-x \neq 1 \Rightarrow x \neq 2

Combining all conditions,

x[6,3){2}x \in [-6, 3) - \{2\}

Comparing with [α,β){γ}[-\alpha, \beta) - \{\gamma\}, we get

α=6,β=3,γ=2\alpha = 6, \quad \beta = 3, \quad \gamma = 2

Therefore,

α+β+γ=6+3+2=11\alpha + \beta + \gamma = 6 + 3 + 2 = 11

So, the correct option is C.](streamdown:incomplete-link)

Detailed Inequality Breakdown

Given: f(x)=cos1(2x4)+(loge(3x))1f(x) = \cos^{-1}\left(\frac{2 - |x|}{4}\right) + \left(\log_e(3-x)\right)^{-1}

Find: The value of α+β+γ\alpha + \beta + \gamma.

First analyze the inverse cosine part:

12x41-1 \leq \frac{2 - |x|}{4} \leq 1

From

2x41\frac{2 - |x|}{4} \leq 1

we get

2x4x22 - |x| \leq 4 \Rightarrow -|x| \leq 2

which is always true.

From

12x4-1 \leq \frac{2 - |x|}{4}

we get

42x6xx6-4 \leq 2 - |x| \Rightarrow -6 \leq -|x| \Rightarrow |x| \leq 6

Hence,

x[6,6]x \in [-6,6]

Now analyze (loge(3x))1\left(\log_e(3-x)\right)^{-1}. The logarithm must exist, so

3x>0x<33-x > 0 \Rightarrow x < 3

Also, because it is in the denominator, it cannot be zero:

loge(3x)0\log_e(3-x) \neq 0

This happens when

3x1x23-x \neq 1 \Rightarrow x \neq 2

Thus the final domain is

[6,6](,3){2}=[6,3){2}[-6,6] \cap (-\infty,3) - \{2\} = [-6,3) - \{2\}

So,

α=6,β=3,γ=2\alpha = 6, \beta = 3, \gamma = 2

and therefore

α+β+γ=11\alpha + \beta + \gamma = 11

Hence, the correct option is C.](streamdown:incomplete-link)

Common mistakes

  • Ignoring the restriction for cos1(y)\cos^{-1}(y) and not enforcing 1y1-1 \leq y \leq 1. This is wrong because inverse cosine is defined only on that interval. Always first bound the argument of the inverse trigonometric function.

  • Checking only 3x>03-x > 0 for loge(3x)\log_e(3-x) and forgetting that (loge(3x))1\left(\log_e(3-x)\right)^{-1} also requires the logarithm to be non-zero. This misses the excluded point x=2x = 2. After finding the logarithm domain, also remove values that make the denominator zero.

  • Treating the given expression as only cos1(2x4)\cos^{-1}\left(\frac{2-|x|}{4}\right) and missing the additional term shown in the solution. This leads to an incomplete domain. Use all parts of the function appearing in the extracted solution while determining the answer.

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