CSAT Solved Papers/ 2025/Q26

2025 CSAT — Q26

Quant Arithmetic & numeracy 2.5 marks Medium

If 4x84 \le x \le 8 and 2y72 \le y \le 7, then what is the ratio of maximum value of (x+y)(x + y) to minimum value of (xy)(x - y)?

  1. A 6
  2. B 152\dfrac{15}{2}
  3. C 152-\dfrac{15}{2}
  4. D None of the above Answer

Worked rationale

Optimise each part at the interval endpoints:

  • (x+y)(x+y) is largest at the largest xx and largest yy: 8+7=158 + 7 = 15.
  • (xy)(x-y) is smallest at the smallest xx and largest yy: 47=34 - 7 = -3.

The required ratio is

max(x+y)min(xy)=153=5.\frac{\max(x+y)}{\min(x-y)} = \frac{15}{-3} = -5.

Now check the options: 5-5 is not 66, not 152\tfrac{15}{2}, not 152-\tfrac{15}{2}.

Answer: (d) None of the above.

Why the other options miss

  • A
    took the wrong endpoints: minimises (xy)(x-y) as |{\cdot}| or uses min(xy)=42=2\min(x-y) = 4 - 2 = 2 (smallest xx, smallest yy), giving 152.5\tfrac{15}{2.5}-type slips toward 66.
  • B
    dropped the sign: takes min(xy)\min(x-y) as the magnitude xminymaxx_{\min} - y_{\max} =2= 2 (e.g. 424-2) and divides 15/215/2, losing the sign and mis-choosing yy.
  • C
    used the wrong yy-endpoint: correctly signs the difference but uses min(xy)=2\min(x-y) = -2 (taking ymax=6y_{\max}=6 or x=4,y=6x=4,y=6), missing that yy ranges up to 77.

Specialist insight

Two precision habits decide this item. First, minimise a difference by pushing the subtrahend up: min(xy)\min(x-y) wants xx as small as allowed and yy as large as allowed — 47=34 - 7 = -3, a negative number. Second, keep the sign — the ratio 15/(3)=515/(-3) = -5 is negative, and the examiner has deliberately omitted 5-5 from (a)–(c) so that every student who mishandles the endpoints or the sign finds a “matching” option. The correct exam reflex on “ratio of extremes” items is to compute the honest value first and only then scan the options; finding it absent is itself the answer. The presence of a clean negative distractor 152-\tfrac{15}{2} is the tell that sign-handling is the trap.

The trap, in one line

min(xy)=47=3\min(x-y) = 4 - 7 = -3 (smallest xx, largest yy), so the ratio is 15/(3)=515/(-3) = -5 — which is *not* listed, making (d) correct.

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