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13 Nov 2019
I need the centroid of the base of the tetrahedron on the last page
In Part 1 of this mini-project, we are going to calculate the volume of a tetrahedron of your making in two different ways. Both methods should, of course, lead to the same result, but in very different ways. In Part 2 of this mini-project, you will use double integrals to find the centroid of the triangular base of your tetrahedron. The set up: Making your tetrahedron. You need four points to make your tetrahedron. We will use the origin (0,0,0) as one of our points. Call that point O. So, we need three more. Pick two points, B and C somewhere IN the first quadrant of the x-y plane, BUT WITH DIFFERENT x and y COORDINATES. (Note 1: REMEMBER, points ON an axis are NOT in any quadrant! AND Note 2: The two points cannot be vertically or horizontally aligned AND Note 3: The two points cannot be collinear with the origin.) Pick a fourth point D, somewhere on the (positive) z-axis. D: (0,0, ) Part 1a: Volume: The Vector Way to find the volume of your tetrahedron. Make sure you clearly label Use the vectors vectors and show all work. A G A 0 ã§ãã§ã D. os
I need the centroid of the base of the tetrahedron on the last page
In Part 1 of this mini-project, we are going to calculate the volume of a tetrahedron of your making in two different ways. Both methods should, of course, lead to the same result, but in very different ways. In Part 2 of this mini-project, you will use double integrals to find the centroid of the triangular base of your tetrahedron. The set up: Making your tetrahedron. You need four points to make your tetrahedron. We will use the origin (0,0,0) as one of our points. Call that point O. So, we need three more. Pick two points, B and C somewhere IN the first quadrant of the x-y plane, BUT WITH DIFFERENT x and y COORDINATES. (Note 1: REMEMBER, points ON an axis are NOT in any quadrant! AND Note 2: The two points cannot be vertically or horizontally aligned AND Note 3: The two points cannot be collinear with the origin.) Pick a fourth point D, somewhere on the (positive) z-axis. D: (0,0, ) Part 1a: Volume: The Vector Way to find the volume of your tetrahedron. Make sure you clearly label Use the vectors vectors and show all work. A G A 0 ã§ãã§ã D. os
Trinidad TremblayLv2
7 Nov 2019