The asymptote of the curve y3 + yx2 - x2 = 0
parallel to x-axis is y = 1.
PLZZ help in this question as a true or false with solution
Answers
Step-by-step explanation:
Here the line y = 0 is the asymptote parallel to X-axis whereas there is no asymptote parallel to Y-axis. For Oblique Asymptotes: In the given equation of curve, expression containing the third degree terms is y3 + x2y + 2xy2 Thus, φ3(m) = m3 + 2m2 + m (by taking y = m, x = 1) so that φ'3(m) = 3m2 + 4m + 1 and φ"3(m) = 6m + 4 Likewise, φ2(m) = 0, φ1(m) = –m φ3 = 0 ⇒ m3 + 2m2 + m = 0 or m = –1, –1, 0 Now for equal values of m in φn(m), corresponding values of ‘c’ are obtained from ⇒ c2/2(6m + 4) + c.o - m = 0 or c2 = m/ 3m + 2 for m = -1, c2 = m/ 3m + 2 = -1/ -3 + 2 = 1 implying c = ± 1 and for m = 0, already we had obtained the parallel asymptote. Therefore, the asymptotes are y = 0, y = –x + 1, y = –x – 1.Read more on Sarthaks.com - https://www.sarthaks.com/495998/find-the-asymptotes-of-the-curve-y-3-x-2y-2xy-2-y-1-0