3. Find the shortest distance from the center of the quadratic surface 9 x2+54 x +4...
Use Lagrange multipliers to find the shortest distance from the point (2,0, -9) to the plane x + y + z = 1 MY NOTES ASK YOUR TEACHER 10. DETAILS SESSCALC2 11.6.049. Find parametric equations for the tangent line to the curve of Intersection of the paraboloid = x2 + y2 and the ellipsoid 3x +212 +722 - 33 at the point (-1,1,2). (Enter
3. (4 pts) Find the shortest distance from the surface xy + 3x + z2 = 9 to the origin.
3. (4 pts) Find the shortest distance from the surface xy + 3x + z2 = 9 to the origin.
show all work thank you 4) (5pts) the region under the surface z x2+ y4, and bounded by the planes x-0 and y-9 4 2 and the cylinder y x 4) (5pts) the region under the surface z x2+ y4, and bounded by the planes x-0 and y-9 4 2 and the cylinder y x
Q4. (5 points). Find the equation of the plane that passes through the line of intersection of the two planes x - 2y = 3 and y- z = 0 and parallel to the line x = y - 1 = 2+1 Q5. (4 points). Find the distance from the point A(1,2,3) and the line 2+1 y-1 2 Q6. (4 points). Give the name and sketch the surface whose equation is given by x2 + 2y2 – 12y – z...
3) Find the absolute maximum and absolute minimum values of x2 Y2 2x2 Зу? - 4x - 5 on the region 25 + + 2Y2 Show that the surfaces 3X2 Z2 4) 9 and x2 Y2Z - 8X - 6Y - 8Z + 24 0 have a common tangent plane at the point (1, 1, 2) Find the maximum and minimum values that 3x - y 3z attains on the intersection of the surfaces x + y 5) 2z2 1...
x2 + y2. Find the shortest The distance between a point (cy) and the origin is given by distance from a point on the curve y = 2-1 to the origin.
5 Let f(x, y) What is the shortest distance d between a point on the surface z = f (x, y) and the origin? xy d =
Please help solve the following with steps. Thank you! 3. Determine the center of mass of the paraboloid given by the surface -4-x2-y2 and (a) ρ(x, y, z)= 1 (b) pr, y,a) 5 0 if -z 3. Determine the center of mass of the paraboloid given by the surface -4-x2-y2 and (a) ρ(x, y, z)= 1 (b) pr, y,a) 5 0 if -z
Consider the following. z = x2 + y2, z = 36 − y, (6, -1, 37) (a) Find symmetric equations of the tangent line to the curve of intersection of the surfaces at the given point. x − 6 12 = y + 1 −2 = z − 37 −1 x − 6 1 = y + 1 12 = z − 37 −12 x − 6 = y + 1 = z − 37 x − 6 12 =...