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r instead of x.
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x: U- R3 and S its intrinsic normal. 3. Let y be a unit speed curve...
Let B: I + R3 be a unit speed curve. Let X be the vector field...
Let B: I + R3 be a unit speed curve. Let X be the vector field along ß defined by X = TT + KB. Prove that T' = X XT, N' = X X N, B' = X B.
(3) Consider f: R3- R3 defined by (u,, w)-f(r, y, :) where u=x w = 3~....
(3) Consider f: R3- R3 defined by (u,, w)-f(r, y, :) where u=x w = 3~. Let A = {1 < x < 2, 0 < xy < 2, 0 < z < 1). Write down (i) the derivative Df as a matrix (ii) the Jacobian determinant, (ii) sketch A in (x, y. :)-space, and iv) sketch f(A) in (u. v, w)-space.
*1. Let S2((x, y, z) e R3:xy+2 be the unit sphere and let A: S2 S,...
*1. Let S2((x, y, z) e R3:xy+2 be the unit sphere and let A: S2 S, be the (antipodal) map A(x, y, z)-(-x,-y,-z). Prove that A is a diffeomorphism.
Multivariable Calculus Image Provided Let C be an oriented curve in R3; f = f(x,y,z) a function a...
Multivariable Calculus
Image Provided
Let C be an oriented curve in R3; f =
f(x,y,z) a function and F a vector
field. Which of the following is true?
The Answer Key (without solution) is telling me the answer
is D....
I really beg you.. could you please explain the reasons
behind why your answer(s) are true and others are false?
While exam is soon, I am really having hard time understanding the
concept--fundamentals behind it.
I will promise to sincerely...
1. (5 pts.) TRue or FALse: (a) Let R denote a plane region, and (u,u) = (u(x,y), u(x,y)) be a dif...
1. (5 pts.) TRue or FALse: (a) Let R denote a plane region, and (u,u) = (u(x,y), u(x,y)) be a different set of l (b) Let R denote a plane region, and (u, v) - (u(x, y), v(x, y)) be a different set of coordinates for the Cartesian plane. Then for any function F(u, v F(u, u)dudu- F(u(x,y),o(x,y))dxdy coordinates for the Cartesian plane. Then (c) Let R denote a square of sidelength 2 defined by the inequalities |x-1, lul (3y,...
(1) Let G(,y, z) = (x,y, z). Show that there exists no vector field A : R3 -> R3 such that curl(A) Hint: compute its...
(1) Let G(,y, z) = (x,y, z). Show that there exists no vector field A : R3 -> R3 such that curl(A) Hint: compute its divergence G. (2) Let H R3 -> R3 be given as H(x,y, z) = (1,2,3). Find a vector potential A : R3 -> R3 such that curl(A) smooth function = H. Show that if A is a vector potential for H, then so is A+ Vf, for any f : R5 -> R (3) Let...
Differential Geometry Prove that for a coordinate patch x(u,v), where U is the unit normal defined...
Differential Geometry
Prove that for a coordinate patch x(u,v), where U is the unit
normal defined as
, and K is the Gaussian Curvature.
L, V 1,0) (0,1 1,0) We were unable to transcribe this image
Let a particle of unit mass be subject to a force where x is its displacement...
Let a particle of unit mass be subject to a force
where x is its displacement from the coordinate origin and the
mass = 2 kg.
a) Derive an equation for
in terms of x.
b) Derive an equation for
, and find the equation for the phase space trajectory, y(x)
I believe Y is the equation given in the beginning of
the problem
3х 1+ 2х We were unable to transcribe this imageWe were unable to transcribe this imageWe...
Question 1. Let y : R -> R' be the parametrised curve 8 (t)= 1+ sin...
Question 1. Let y : R -> R' be the parametrised curve 8 (t)= 1+ sin t Cost 5 Cos (a) (2 marks) Show that y is unit speed (7 marks) Find, at each point on the curve, the principal tangent T, principal normal (b) N, binormal B, curvature K, and torsion 7. (c) (3 marks) Show directly that T, N, B satisfy the Frenet-Serret frame equations (d) (3 marks) Show that the image of y lies in a plane...
Help would be greatly appreciated!! 1. Let S be the surface in R3 parametrized by the vector function ru, v)(,-v, v+ 2u) with domain D-{(u, u) : 0 u 1,0 u 2). This surface is a plane segment shaped...
Help would be greatly appreciated!!
1. Let S be the surface in R3 parametrized by the vector function ru, v)(,-v, v+ 2u) with domain D-{(u, u) : 0 u 1,0 u 2). This surface is a plane segment shaped like a parallelogram, and its boundary aS (with positive orientation) is made up of four line segments. Compute the line integral fos F -dr where F(z, y, z) = 〈エ2018 + y, 2r, r2-Ins). Hint: use Stokes' theorem to transform this...
Let B: I + R3 be a unit speed curve. Let X be the vector field along ß defined by X = TT + KB. Prove that T' = X XT, N' = X X N, B' = X B.
(3) Consider f: R3- R3 defined by (u,, w)-f(r, y, :) where u=x w = 3~. Let A = {1 < x < 2, 0 < xy < 2, 0 < z < 1). Write down (i) the derivative Df as a matrix (ii) the Jacobian determinant, (ii) sketch A in (x, y. :)-space, and iv) sketch f(A) in (u. v, w)-space.
*1. Let S2((x, y, z) e R3:xy+2 be the unit sphere and let A: S2 S, be the (antipodal) map A(x, y, z)-(-x,-y,-z). Prove that A is a diffeomorphism.
Multivariable Calculus
Image Provided
Let C be an oriented curve in R3; f =
f(x,y,z) a function and F a vector
field. Which of the following is true?
The Answer Key (without solution) is telling me the answer
is D....
I really beg you.. could you please explain the reasons
behind why your answer(s) are true and others are false?
While exam is soon, I am really having hard time understanding the
concept--fundamentals behind it.
I will promise to sincerely...
1. (5 pts.) TRue or FALse: (a) Let R denote a plane region, and (u,u) = (u(x,y), u(x,y)) be a different set of l (b) Let R denote a plane region, and (u, v) - (u(x, y), v(x, y)) be a different set of coordinates for the Cartesian plane. Then for any function F(u, v F(u, u)dudu- F(u(x,y),o(x,y))dxdy coordinates for the Cartesian plane. Then (c) Let R denote a square of sidelength 2 defined by the inequalities |x-1, lul (3y,...
(1) Let G(,y, z) = (x,y, z). Show that there exists no vector field A : R3 -> R3 such that curl(A) Hint: compute its divergence G. (2) Let H R3 -> R3 be given as H(x,y, z) = (1,2,3). Find a vector potential A : R3 -> R3 such that curl(A) smooth function = H. Show that if A is a vector potential for H, then so is A+ Vf, for any f : R5 -> R (3) Let...
Differential Geometry
Prove that for a coordinate patch x(u,v), where U is the unit
normal defined as
, and K is the Gaussian Curvature.
L, V 1,0) (0,1 1,0) We were unable to transcribe this image
Let a particle of unit mass be subject to a force
where x is its displacement from the coordinate origin and the
mass = 2 kg.
a) Derive an equation for
in terms of x.
b) Derive an equation for
, and find the equation for the phase space trajectory, y(x)
I believe Y is the equation given in the beginning of
the problem
3х 1+ 2х We were unable to transcribe this imageWe were unable to transcribe this imageWe...
Question 1. Let y : R -> R' be the parametrised curve 8 (t)= 1+ sin t Cost 5 Cos (a) (2 marks) Show that y is unit speed (7 marks) Find, at each point on the curve, the principal tangent T, principal normal (b) N, binormal B, curvature K, and torsion 7. (c) (3 marks) Show directly that T, N, B satisfy the Frenet-Serret frame equations (d) (3 marks) Show that the image of y lies in a plane...
Help would be greatly appreciated!!
1. Let S be the surface in R3 parametrized by the vector function ru, v)(,-v, v+ 2u) with domain D-{(u, u) : 0 u 1,0 u 2). This surface is a plane segment shaped like a parallelogram, and its boundary aS (with positive orientation) is made up of four line segments. Compute the line integral fos F -dr where F(z, y, z) = 〈エ2018 + y, 2r, r2-Ins). Hint: use Stokes' theorem to transform this...
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