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JEE Mathematics 2023 Question with Solution

The number of integral solutions of log2(x72x3)0\log_2 \left( \frac{x - 7}{2x - 3} \right) \geq 0 is:

  • A

    55

  • B

    77

  • C

    88

  • D

    66

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: log2(x72x3)0\log_2 \left( \frac{x - 7}{2x - 3} \right) \geq 0

Find: The number of integral solutions.

Since the base is 2>12>1, we use

log2t0    t1\log_2 t \geq 0 \iff t \geq 1

with the argument defined. So we solve

x72x31\frac{x - 7}{2x - 3} \geq 1

Now,

x72x310\frac{x - 7}{2x - 3} - 1 \geq 0 x7(2x3)2x30\frac{x - 7 - (2x - 3)}{2x - 3} \geq 0 x42x30\frac{-x - 4}{2x - 3} \geq 0 x+42x30\frac{x + 4}{2x - 3} \leq 0

Critical points are x=4x=-4 and x=32x=\frac{3}{2}. Using sign analysis,

4x<32-4 \leq x < \frac{3}{2}

This interval already keeps the logarithm argument positive because the quantity is at least 11 there.

Hence the integral values are

4,3,2,1,0,1-4,-3,-2,-1,0,1

So the number of integral solutions is 66. Therefore, the correct option is D.

The solution states the correct option is D, although some intermediate domain discussion there is incomplete.

Sign Analysis

Given: log2(x72x3)0\log_2 \left( \frac{x - 7}{2x - 3} \right) \geq 0

Find: Count of integral values of xx.

Let

y=x72x3y = \frac{x - 7}{2x - 3}

Then

log2y0y1\log_2 y \geq 0 \Rightarrow y \geq 1

because the logarithm with base 22 is increasing.

So,

x72x31\frac{x - 7}{2x - 3} \geq 1 x72x310\frac{x - 7}{2x - 3} - 1 \geq 0 x72x+32x30\frac{x - 7 - 2x + 3}{2x - 3} \geq 0 x42x30\frac{-x - 4}{2x - 3} \geq 0 x+42x30\frac{x + 4}{2x - 3} \leq 0

Now examine intervals formed by x=4x=-4 and x=32x=\frac{3}{2}:

  • For x<4x<-4, numerator is negative and denominator is negative, so the ratio is positive, which does not satisfy 0\leq 0.
  • For 4<x<32-4<x<\frac{3}{2}, numerator is positive and denominator is negative, so the ratio is negative, which satisfies 0\leq 0.
  • For x>32x>\frac{3}{2}, numerator is positive and denominator is positive, so the ratio is positive, which does not satisfy 0\leq 0.
  • At x=4x=-4, the ratio is 00, so it is included.
  • At x=32x=\frac{3}{2}, the expression is undefined, so it is excluded.

Therefore,

4x<32-4 \leq x < \frac{3}{2}

The integers in this interval are 4,3,2,1,0,1-4,-3,-2,-1,0,1, giving 66 integral solutions.

Therefore, the correct option is D.

Common mistakes

  • Students often write x72x31x72x3\frac{x-7}{2x-3} \geq 1 \Rightarrow x-7 \geq 2x-3 directly. This is wrong because the sign of 2x32x-3 is unknown, so cross-multiplication can reverse the inequality. First bring everything to one side and use sign analysis.

  • Another mistake is checking only x7>0x-7>0 for the logarithm domain. This is incomplete because the full argument x72x3\frac{x-7}{2x-3} must be positive. In this question, solving x72x31\frac{x-7}{2x-3} \geq 1 already enforces positivity.

  • Some students include x=32x=\frac{3}{2} during interval counting. This is incorrect because the denominator becomes zero there, so the logarithm argument is undefined. Exclude all points where the expression is undefined before counting integers.

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