CUET · MATHS · PYQ PAPER 2025
If \(\mathbb{Z}\) and \(\mathbb{R}\) set of integers and set of real numbers respectively, then match List I with List II.
| List - I | List - II |
| (A) \(5 x-3<3 x+1, x \in \mathbb{Z}\) | (I) \(x \in(-\infty,-3)\) |
| (B) \(3 x+17 \leq 2(1-x), x \in \mathbb{R}\) | (II) \(x \in(-\infty,-1)\) |
| (C) \(13 x+17<2(1-x), x \in \mathbb{R}\) | (III) \(\{\ldots,-4,-3, \ldots, 0,1\}\) |
| (D) \(\frac{2 x+3}{5}-2>\frac{3(x-2)}{5}, x \in \mathbb{Z}\) | (IV) \(\{\ldots,-4,-3,-2\}\) |
- A (A) - (I), (B) - (III), (C) - (II), (D) - (IV)
- B (A) - (II), (B) (IV), (C) - (I), (D) - (III)
- C (A) - (III), (B) - (I), (C) - (II), (D) - (IV)
- D (A) - (IV), (B) - (II), (C) - (I), (D) - (III)
Answer & Solution
Correct Answer
(C) (A) - (III), (B) - (I), (C) - (II), (D) - (IV)
Step-by-step Solution
Detailed explanation
\(5x - 3 < 3x + 1\) \(2x < 4\) \(x < 2\) \(x \in \mathbb{Z} \implies x \in \{\ldots, 0, 1\}\) Matches (III) \(3x + 17 \leq 2(1-x)\) \(3x + 17 \leq 2 - 2x\) \(5x \leq -15\) \(x \leq -3\) \(x \in \mathbb{R} \implies x \in (-\infty, -3]\) Matches (I) (closest option…
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