CSAT Solved Papers/ 2024/Q76
2024 CSAT — Q76
If means ‘greater than ’; means ‘less than ’; means ‘not greater than ’; means ‘not less than ’ and means ‘equal to ’, then consider the following statements:
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If and , then .
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If and , then .
Which of the statements given above is/are correct?
Worked rationale
Decode each symbol, then test whether the conclusion is forced or can be broken by a counterexample.
Statement 1. Premises: and . Claimed conclusion: .
From , , so . From , . Hence , i.e. . The conclusion is therefore never true — the derivation gives the opposite inequality. Statement 1 is false.
Statement 2. Premises: and . Claimed conclusion: .
From , , so gives only — not . Counterexample: satisfies and , yet would need , 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 () or chains the inequalities the wrong way, concluding instead of .
- B stops at and reads it as , never searching for the 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 lets you eliminate a variable and discover the conclusion is exactly reversed — a , not the claimed . In Statement 2 the factor of in "" is the trap: it survives into , which is strictly weaker than , so a single fractional counterexample ( just under , ) demolishes it. The general discipline: to validate ” relation ” claims, either prove the chain or kill it with one explicit counterexample — do not assume transitivity when a coefficient distorts the scale.
Decode the symbols and re-derive: Statement 1 actually yields (not ), and "" gives only , broken by — so neither holds .