← 2020 Paper 1
UPSC 2020 Maths Optional Paper 1 Q1d — Step-by-Step Solution
10 marks · Section A
Asymptotes · Calculus · Read the full method →
Question
Find all the asymptotes of the curve (2x+3)y=(x−1)2.
Technique
Write y explicitly; vertical asymptote at zero of denominator; oblique asymptote via long division (or m=limy/x, c=lim(y−mx)).
Solution
Solve for y:
y=2x+3(x−1)2=2x+3x2−2x+1.
The curve is a rational function (degree of numerator 2, denominator 1): expect one vertical asymptote and one oblique asymptote (no horizontal asymptote, since numerator degree > denominator degree).
Step 1 — Vertical asymptote
y→∞ where the denominator vanishes but the numerator does not. 2x+3=0⇒x=−23; at x=−23 the numerator is (−23−1)2=425=0. Hence
x=−23 (vertical asymptote).
Step 2 — Oblique asymptote by polynomial division
Divide x2−2x+1 by 2x+3:
2x+3x2−2x+1=2x−47+2x+325/4.
Check of division: (2x−47)(2x+3)=x2+23x−27x−421=x2−2x−421; adding the remainder 425 gives x2−2x+1 ✓.
As x→±∞, the term 2x+325/4→0, so
y→2x−47.
y=21x−47, i.e. 4y=2x−7(oblique asymptote).
Step 3 — Complete list
Answer
x=−23andy=2x−47.