# Parametrize the curve of intersection of the given surfaces. 1st surface: x^4 + y^4 +2z^2 = 1. 2nd surface: z=xy. Please explain!?

• Parametrize the curve of intersection of the given surfaces. 1st surface: x^4 + y^4 +2z^2 = 1. 2nd surface: z=xy. Please explain!?

... given surfaces. 1st surface: x^4 + y^4 +2z^2 ... Parametrize the curve of intersection of the given surfaces. 1st surface: x^4 + y^4 +2z^2 = 1. 2nd ...
Positive: 51 %
Find a parametrization of the intersection curve between surfaces. ... parametrize the curve of intersection ... surface z= x2 + y2 at the point (1 ...
Positive: 48 %

### More resources

Calculate $$\int_{C}^{} \frac{ydx-(x+1)dy}{x^2+y^2+2x+1}$$ where C is the curve ... {ydx-(x+1)dy}{x^2+y^2+2x+1} $$where C is the curve$$ |x|+|y|=4 ...
Positive: 51 %
Let be y = ln x, 1 x 2. ompute x2 ds We parametrize the curve as x(t) = (t, ln t), 1 t 2. We can compute that ds = x dt = 1 + 1/t 2 dt. Hence, ...
Positive: 46 %
~vd~x. 4.(Surface Integrals{Basic de nition and parametrization) (a). Parametrize the surfaces and compute d ... yp 3;z = 1. (ii). z = xy;1 x 2;1 y 3. (iii ...