← 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=(x1)2(2x+3)y=(x-1)^2.

Technique

Write yy explicitly; vertical asymptote at zero of denominator; oblique asymptote via long division (or m=limy/xm=\lim y/x, c=lim(ymx)c=\lim(y-mx)).

Solution

Solve for yy:

y=(x1)22x+3=x22x+12x+3.y=\frac{(x-1)^2}{2x+3}=\frac{x^2-2x+1}{2x+3}.

The curve is a rational function (degree of numerator 22, denominator 11): expect one vertical asymptote and one oblique asymptote (no horizontal asymptote, since numerator degree >> denominator degree).

Step 1 — Vertical asymptote

yy\to\infty where the denominator vanishes but the numerator does not. 2x+3=0x=322x+3=0\Rightarrow x=-\tfrac32; at x=32x=-\tfrac32 the numerator is (321)2=2540(-\tfrac32-1)^2=\tfrac{25}{4}\neq0. Hence

x=32 (vertical asymptote).\boxed{x=-\tfrac32}\ \text{(vertical asymptote).}

Step 2 — Oblique asymptote by polynomial division

Divide x22x+1x^2-2x+1 by 2x+32x+3:

x22x+12x+3=x274+25/42x+3.\frac{x^2-2x+1}{2x+3}=\frac{x}{2}-\frac{7}{4}+\frac{25/4}{2x+3}.

Check of division: (x274)(2x+3)=x2+3x27x2214=x22x214\left(\tfrac{x}{2}-\tfrac74\right)(2x+3)=x^2+\tfrac{3x}{2}-\tfrac{7x}{2}-\tfrac{21}{4}=x^2-2x-\tfrac{21}{4}; adding the remainder 254\tfrac{25}{4} gives x22x+1x^2-2x+1 ✓.

As x±x\to\pm\infty, the term 25/42x+30\dfrac{25/4}{2x+3}\to0, so

yx274.y\to\frac{x}{2}-\frac{7}{4}. y=12x74, i.e. 4y=2x7(oblique asymptote).\boxed{y=\tfrac12 x-\tfrac74,\ \text{i.e. } 4y=2x-7\quad\text{(oblique asymptote).}}

Step 3 — Complete list

Answer

  x=32andy=x274.  \boxed{\;x=-\frac32\quad\text{and}\quad y=\frac{x}{2}-\frac{7}{4}.\;}
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