12. Find the radius of curvature of the
curve y2-3xy-4x2+x3+x4y+y5=0 at the
origin.
Answers
Answer:
This curve is somewhat well-known; it is called the folium of Descartes.
There might be a sleeker way to do this, but I find that the usual curvature formula for plane curves works nicely enough: to find the curvature of the curve y=f(x) at the point (x0,f(x0)) , we have
κ(x0)=|f′′(x0)|[1+f′(x0)2]3/2
Even if our curve is not exactly a one-to-one function, locally, we can say it is, and implicit differentiation will save us here. Let’s pretend that y=f(x) for some f around the point (3a/2,3a/2) . Then, by differentiating both sides of the equation with respect to x, we get
3x2+3y2y′=3ay+3axy′
and isolating y’ yields
y′=3x2−3ay3ax−3y2=x2−ayax−y2
Then, to get y′′ , we just differentiate y′ with respect to x :
y′′=(ax−y2)(2x−ay′)−(x2−ay)(a−2yy′)(ax−y2)2
(Exercise: show that y′′=2ax2y(ax−y2)3 .)
Substituting x=y=3a2 gives us y′=−1 , y′′=−323a and so
κ(3a2)=323a22–√=82–√3a
The radius of curvature is, of course, 1κ=3a82–√ .
You can also do it using a parametrization and the usual curvature formulas for parametric space curves, but I’m not too thrilled about all those quotient rules. Then again, all things considered, it might be the same amount of work. For your information, the usual parametrization is
x=3at1+t3
y=3at21+t3
and the desired point is given by t=1.
pls mark as brainlieast
Answer:
(85/2)√17 and 5√2
Explanation:
Explaination provided in the attachment. I have used Newton's Method to find out the Curvature at Origin.
