49 - 22 - y2 and the plane Determine the volume enclosed between the hemispherical surface...
Find the volume of the solid that lies inside the sphere x2 + y2 + 2 = 18 and outside of the cylinder 22 + y2 = 2 (Note: Remember to type pi for . Also keep fractions, for example write 1/2 not 0.5.) V=
Find the volume of the solid bounded by the cylinder x2 + y2 = 1, and the planes 2x + 3y + 2z = 7 and 2 = 0 (Note: Remember to type pi for 7. Also keep fractions, for example write 1/2 not 0.5.) V= M
Evaluate Sl] (z2 + y2 + 22)-1/2 av je D where D is the solid between the spheres 22 + y2 + 2 = 14 and 22 + y2 + 2 = 19 (Note: Remember to type pi for . Also keep fractions, for example write 1/2 not 0.5.) 11/ 62+72+27-14 + y2 + 22)-1/2 dv=
Find the volume of the solid bounded by the cylinder z2 + y2 =1, and the planes 3 + 4y +9z=9 and z=0 (Note: Remember to type pi for. Also keep fractions, for example write 1/2 not 0.5.) V= Next Submit Assignment Quit & Save Question Menu 4x ENG 1:44 AM 2020-07-30
Find the volume of the solid that lies inside the sphere 2 + y2 + 2 - 24 and outside of the cylinder 2 + y2 = 8 (Note: Remember to type pi for. Also keep fractions, for example write 1/2 not 0.5.) V Submit Assignment Quit & Save Back Question Menu - Ad* ENG 1:47 AM 2020-07-30
er 20 / Quiz 9 Remaining Time: 138:14 Evaluate 8 +y2 +22)-1/2 av where D is the solid between the spheres 22 + y2 + 2 = 20 and 2 + y2 + 2 – 34 (Note: Remember to type pi for. Also keep fractions, for example write 1/2 not 0.5.) IS + y2 +22)-1/2 dv= D Submit Assignment Quit & Save Back Question M O 4x ENG
Evaluate (*V19x2 + 19y2 dA, where D is the shaded region enclosed by the lemniscate curve r = sin(20) in the figure. r2 = sin 20 0.5 os (Use symbolic notation and fractions where needed.) «V19x + 19da = 0 Use cylindrical coordinates to find the volume of the region bounded below by the plane z = 3 and above by the sphere x2 + y2 + 2 = 25. (Use symbolic notation and fractions where needed.) V =
1. Calculate the surface area of = Vx2 + y2 that lies between the plane (a) that part of the cone yx and the cylinder y = x2 (b) that part of the surface 1 + 3x +2y2 that lies above the triangle with vertices (0,0), (0,1) and (2,1) z= (c) the helicoid (spiral ramp) defined by r(u, v)= u cos vi +usin vj-+ vk, 0u 1,0 < v < T 1. Calculate the surface area of = Vx2 +...
Let MM be the capped cylindrical surface which is the union of two surfaces, a cylinder given by x2+y2=81, 0≤z≤1x2+y2=81, 0≤z≤1, and a hemispherical cap defined by x2+y2+(z−1)2=81, z≥1x2+y2+(z−1)2=81, z≥1. For the vector field F=(zx+z2y+4y, z3yx+4x, z4x2)F=(zx+z2y+4y, z3yx+4x, z4x2), compute ∬M(∇×F)⋅dS∬M(∇×F)⋅dS in any way you like (1 point) Let M be the capped cylindrical surface which is the union of two surfaces, a cylinder given by X2 + y2-81, 0 < ž < 1, and a hemispherical cap defined by...
Determine the option that contains the equation of the tangent plane the surface z=x2+y2 on the point (-2,1,5) Determine la opción que contiene la ecuación del plano tangente la superficie z= x2 + y2 en el punto (-2,1,5) O-41 + 2y - 2–5 = 0 O-42 - 2y +2 -11=0 O 4x - 2y – 2 + 17 = 0 O NO ESTÁ LA RESPUESTA