

*Thermodynamics* The plane z Ax + By C is to be "fitted" to the following points...
Transformation T:R' -»R',T(x,y, z) = (x+y,x-z)nd v=< 1,-1,2 > 8. ar iven B <1,1,1>,< 1,0,1 ><-1,0,1>},B^ = {<1,1>,<1,0 >},and B, = {<1,0>,< 1,1>} B to Biand from B to B2 a) Find the Transition matrix from b) Find v],T[v];,7[v] c) Find v,and [v]p d) What did you conclude?
Transformation T:R' -»R',T(x,y, z) = (x+y,x-z)nd v= 8. ar iven B ,},B^ = {,},and B, = {,} B to Biand from B to B2 a) Find the Transition matrix from b) Find...
Find the equation for a plane containing 3 points: A(2, 2,1) in the form: ax+by+cz+d = 0 C(0, -2,1). Put the plane equation B(3,1, 0) х — 3 z+2 = y+5 = 2 L: Find the intersection point between 2 lines whose symmetric equations are: 4 х-2 L, : у-2 = z-3 -3 Find the parametric equation for a line that is going through point A(2,4,6) and perpendicular to the plane 5х-3у+2z-4%3D0. Name: x-3y4z 10 Find the distance between 2...
3.(10 points) Find an equation of the tangent plane to the surface (a) z = xe” at the point P(1,0,1). (6) sin xz - 4 cos yz = 4 at the point P(11,1,1).
#6 Letter C, can you please explain how you got the answer. and
to check the answer key says its 1/144
Math 5C- Review 3 -Spring 19 1.) Evaluate. a) (c.) Jp z cos() dA, Dis bounded by y 0, y- 2, and 1 (d.) vd dA, D is the triangular region with vertices (0,2),(1,1), and (3,2) (a.) olr+v) dA, D is the region bounded by y and z 2.) Evaluate 3.) Evaluate J p cos(r +y)dA, where D is...
Previous ProblemPlUDIelfLis (1 point) You are given the four points in the plane A (1,1), B- (4,-2), C (7,2), and D The graph of the function f(z) consists of the three line segments AB, BC and CD (11, -2) Find the integralf() dz by interpreting the integral in terms of sums and/or differences of areas of elementary figures f(z) de-
Previous ProblemPlUDIelfLis (1 point) You are given the four points in the plane A (1,1), B- (4,-2), C (7,2), and...
8. (16 points) Suppose you use a quadratic curve y = ax? +b to fit the three (x,y) points (1,3), (0,-1), (-1,1). Use matrix method as described in class to find the least squares estimate of the constants a and b in the above equation. In particular, formulate the relevant normal equation, whose solution leads to the least squares estimates of a and b, and hence obtain the least squares estimate of a and b.
4. (4 pts) Consider the
surface z=x2y+y3.(a) Find the normal direction of the tangent plane
to the surface through (1,1,2).(b) Find the equation of the tangent
plane in (a).(c) Determine the value a so that the vector−→v=−−→i+
2−→j+a−→k is parallel to the tangent plane in (a).(d) Find the
equation of the tangent line to the level curve of the surface
through (1,1).
4. (4 pts) Consider the surface z = z2y + y). (a) Find the normal direction of the...
Problem 4 (30 points) If D= (2y + 2)ax + 4.ryay + ra, C/m², find (a) (10 points) The volume charge density at (-1,0, 3) (b) (10 points) The flux through the cube defined by 0 <r <1,0 Sy<1,02<1 (c) (10 points) The total charge enclosed by the cube
1. (15 points) (a) (5 points) Find the equation of the plane a that contains points A(1,5,4) B(1,0, 1) and C(4, 0,5) (b) (5 points) Find the distance from the point D(2, 1,7) to this plane (c) (5 points) If plane 3 has equation y -3z+2x = 5, find a unit vector that is parallel to the intersection of a and B.
(1 point) Do the following for the points (-3,1), (-2,2),(-1,1), (1,-2), (3,-2): (If you are entering decimal approximations, enter at least five decimal places (a) Find the equation for the best-fitting parabolay.2 +ba c for these points: y0.0139x*2-0.6887x-0.209 (b) Find the equation for the best-fitting parabola with no constant term y2b for these points: (c) Find the equation for the best-fitting parabola with no linear term yc for these points: 0.414xA2-0.6805x Ch5.2b Least Squares and Curve Fitting: Problem 5 Previous...