Match each equation with its name. (calculus 3) (x/7)^2-(y/9)^2=z/4 (x/7)^2-y/9+(z/4)^2=0 −x/7+(y/9)^2+(z/4)^2=0 (x/7)^2+(y/9)^2=(z/4)^2 (x/7)^2+(y/7)^2+(z/7)^2=1 Hyperbolic paraboloid Elliptic...

Consider the hyperbolic paraboloid with equation z = x^2 - y^2. What is the directional derivative...

Consider the hyperbolic paraboloid with equation z = x^2 - y^2. What is the directional derivative when x = 5 and y = 3 in the direction from (5,3) to (8,7)? What is the direction for the maximum directional derivative at (5,3)? What is the maximum directional derivative at (5,3)?

Find the hyperbolic equation 8) Foci F(±4, 0) and asymptotes y = ± [x√(14) / √(2)]...

Find the hyperbolic equation 8) Foci F(±4, 0) and asymptotes y = ± [x√(14) / √(2)] 9) Foci F(0, ±√(19)) and asymptotes y = ± [2x√(3) / √(7)] 10) Foci F(±11, 0) and asymptotes y = ± [2x√(10) / 9]

Consider the part of the paraboloid x = 4 − y ^2 − z ^2 that...

Consider the part of the paraboloid x = 4 − y ^2 − z ^2 that lies in front of the plane x = 0. (a) What is its mass if its density is ρ(x, y, z) = y^2 + z ^2 g/cm^2 ? (b) What is its surface area?

4. Consider the solid bounded by the paraboloid x^2+ y^2 + z = 9 as well...

4. Consider the solid bounded by the paraboloid x^2+ y^2 + z = 9 as well as by the planes y = 3x and z = 0 in the first octant. (a) Graph the integration domain D. (b) Calculate the volume of the solid with a double integral.

1-classify the quatric in R^3 with the equation , then determine the center of each. -3...

1-classify the quatric in R^3 with the equation , then determine the center of each. -3 x2 +7y2 +72x +126y +z +95=0 2- prove that the quadric surface E with equation is a hyperbolic paraboloid. Determine its center y - yz =xz

Let F(x, y, z) = z tan−1(y^2)i + z^3 ln(x^2 + 7)j + zk. Find the...

Let F(x, y, z) = z tan−1(y^2)i + z^3 ln(x^2 + 7)j + zk. Find the flux of F across S, the part of the paraboloid x^2 + y^2 + z = 29 that lies above the plane z = 4 and is oriented upward.

Given S is the surface of the paraboloid z= 4-x^2-y^2 and C is the curve of...

Given S is the surface of the paraboloid z= 4-x^2-y^2 and C is the curve of intersection of the paraboloid with the plane z=0. Verify stokes theorem for the field F=2zi+xj+y^2k.( you might verify it by checking both sides of the theorem)

Describe the given surface z = sqrt(1-(x^2+y^2)) a. cone b. top half of sphere c. top...

Describe the given surface z = sqrt(1-(x^2+y^2)) a. cone b. top half of sphere c. top half of ellipsoid d. paraboloid

(To find the trace using substitution) Substitute the equation for each coordinate plane (z=0, x=0, or...

(To find the trace using substitution) Substitute the equation for each coordinate plane (z=0, x=0, or y=0 one at at time) into the quadric surface equation. Simplify the equation and write it in standard form. x^2/4+y^2/9−z^2/12=1 x^2/4−y^2/9−z^2/12=1 x^2/4+y^2/9+z^2/12=1

7. Given The triple integral E (x^2 + y^2 + z^2 ) dV where E is...

7. Given The triple integral E (x^2 + y^2 + z^2 ) dV where E is bounded above by the sphere x 2 + y 2 + z 2 = 9 and below by the cone z = √ x 2 + y 2 . i) Set up using spherical coordinates. ii) Evaluate the integral