WE CAN CHOOSE MORE THAN ONE SELECTION
The answer may be hyperboloid of two sheets and a cone (elliptic)
WE CAN CHOOSE MORE THAN ONE SELECTION Describe the graph of 9x2 - y2 + 1622...
(a) Find and identify the traces of the quadric surface x2 + y2 ? z2 = 16 given the plane. x = k Find the trace. y = k Find the trace. z = k Find the trace. Describe the surface from one of the graphs in the table. ellipsoid elliptic paraboloid hyperbolic paraboloid cone hyperboloid of one sheet hyperboloid of two sheets
Identify the surface 4.x2 - y2 + 2z2 +4 = 0. Hyperboloid of one sheets Elliptic paraboloid Hyperbolic paraboloid None of the above or below Hyperboloid of two sheets Ellipsoid
Consider the surface whose equation is z = -2(y+1)^2 + (x+1)^2 - 1 i) determine a surface of the form (*) whose graph you can translate, rotate, or reflect to obtain the graph of the given surface. Provide the steps one would follow to manipulate the graph of your surface to get the graph of the given surface. Form could be Ellipsoid, Cone, Elliptic Paraboloid, Hyperboloid of One sheet, Hyperbolic paraboloid, and Hyperboloid of two sheets.
Consider the following equation of a quadric surface. a. Find the intercepts with the three coordinate axes, when they exist. b. Find the equations of the xy-, xz-, and yz-traces, when they exist. c. Identify and sketch a graph of the surface. + 10022 - - 4-0 c. Identify the shape of the surface. Hyperboloid of two shoots 0 Elliptic cone Hyperboloid one sheet O Ellipsold O Elliptic paraboloid O Hyperbolic paraboloid Choose the correct graph below. OA ов. c....
you can choose more than one answer! Question 2 Suppose you have to use spherical coordinates to the triple integy where is the solid region that lies incide the cone - V2 + y2 and wade the sphere 2+2+2-36 3 ports Then the triple ingral in terms of spical coordinates is given by Select all that apply *****,)..1-1 *****0,7.1.1-x-fift ******).T/9---fff *******<,)1,9---ff- - A---6"L" /dcbi* * * av - "L" /can din é do dys - [--- 6"""" povremo to use...
NO.25 in 16.7 and NO.12 in 16.9 please. For the vector fied than the vecto and outgoing arrows. Her can use the formula for F to confirm t n rigtppors that the veciors that end near P, are shorter rs that start near p, İhus the net aow is outward near Pi, so div F(P) > 0 Pi is a source. Near Pa, on the other hand, the incoming arrows are longer than the e the net flow is inward,...