CSAT Solved Papers/ 2024/Q76

2024 CSAT — Q76

Quant Statement validity 2.5 marks Hard

If PP means ‘greater than (>)(>)’; QQ means ‘less than (<)(<)’; RR means ‘not greater than ()(\leq)’; SS means ‘not less than ()(\geq)’ and TT means ‘equal to (=)(=)’, then consider the following statements:

  1. If 2x(S)3y2x\,(S)\,3y and 3x(T)4z3x\,(T)\,4z, then 9y(P)8z9y\,(P)\,8z.

  2. If x(Q)2yx\,(Q)\,2y and y(R)zy\,(R)\,z, then x(R)zx\,(R)\,z.

Which of the statements given above is/are correct?

  1. A 1 only
  2. B 2 only
  3. C Both 1 and 2
  4. D Neither 1 nor 2 Answer

Worked rationale

Decode each symbol, then test whether the conclusion is forced or can be broken by a counterexample.

Statement 1. Premises: 2x3y2x \ge 3y and 3x=4z3x = 4z. Claimed conclusion: 9y>8z9y > 8z.

From 3x=4z3x = 4z, z=3x4z = \tfrac{3x}{4}, so 8z=6x8z = 6x. From 2x3y2x \ge 3y, 3y2x9y6x3y \le 2x \Rightarrow 9y \le 6x. Hence 9y6x=8z9y \le 6x = 8z, i.e. 9y8z9y \le 8z. The conclusion 9y>8z9y > 8z is therefore never true — the derivation gives the opposite inequality. Statement 1 is false.

Statement 2. Premises: x<2yx < 2y and yzy \le z. Claimed conclusion: xzx \le z.

From yzy \le z, 2y2z2y \le 2z, so x<2y2zx < 2y \le 2z gives only x<2zx < 2z — not xzx \le z. Counterexample: x=1.9, y=1, z=1x = 1.9,\ y = 1,\ z = 1 satisfies x<2y (1.9<2)x < 2y\ (1.9 < 2) and yz (11)y \le z\ (1 \le 1), yet xzx \le z would need 1.911.9 \le 1, which is false. Statement 2 is false.

Both fail, so neither is correct.

Answer: (d) Neither 1 nor 2.

Why the other options miss

  • A
    mis-decodes SS (\geq) or chains the inequalities the wrong way, concluding 9y>8z9y > 8z instead of 9y8z9y \le 8z.
  • B
    stops at x<2zx < 2z and reads it as xzx \le z, never searching for the x=1.9, y=z=1x = 1.9,\ y = z = 1 counterexample that breaks transitivity.
  • C
    takes the coded conclusions at face value: accepts both without re-deriving them, compounding the errors in (a) and (b).

Specialist insight

Coded-inequality items reward substituting the symbol meanings and then doing genuine inequality algebra, not pattern-matching the letters. In Statement 1 the equality 3x=4z3x = 4z lets you eliminate a variable and discover the conclusion is exactly reversed — a \le, not the claimed >>. In Statement 2 the factor of 22 in "x<2yx < 2y" is the trap: it survives into x<2zx < 2z, which is strictly weaker than xzx \le z, so a single fractional counterexample (xx just under 22, y=z=1y = z = 1) demolishes it. The general discipline: to validate ”AA relation BB” claims, either prove the chain or kill it with one explicit counterexample — do not assume transitivity when a coefficient distorts the scale.

The trap, in one line

Decode the symbols and re-derive: Statement 1 actually yields 9y8z9y\le 8z (not >>), and "x<2y, yzx<2y,\ y\le z" gives only x<2zx<2z, broken by x=1.9,y=z=1x=1.9,y=z=1 — so neither holds =(d)=(d).

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