### Ask Your question

Need a fast expert's response?

Submit orderand get a quick answer at the best price

for any assignment or question with DETAILED EXPLANATIONS!

### Search & Filtering

Q no. 3) let

f(t)= { e^-1/t^2 if t not equal to 0

{0. If t=0

You may assume f is C ^infinity with f^(n) =0 for all n. Let a(t) be given by

a(t) = {(t,f(t),0) if t<0

{(0,0,0) if t=0

{(t,0,f(t) if t>0

a) prove that a is regular and c^infinity .

b) show that k=0 at t=0

a consist of curves in two different planes joined together at a point where k=0.

Q no. 4) let a(s) be a unit speed curve

A) prove that the tangent spherical image of alpha (a) is a constant curve iff. a is straight line.

B) prove that the binormal spherical image of a is a constant curve iff. a is a plane curve.

C) prove that the normal spherical image of a is never constant.

Qno. 6 ) let a(s) be a unit speed curve k>0 . Let s star be arc length on the normal spherical image. Prove k= | ds star /ds| iff. a (alpha) is a plane curve.

f(t)= { e^-1/t^2 if t not equal to 0

{0. If t=0

You may assume f is C ^infinity with f^(n) =0 for all n. Let a(t) be given by

a(t) = {(t,f(t),0) if t<0

{(0,0,0) if t=0

{(t,0,f(t) if t>0

a) prove that a is regular and c^infinity .

b) show that k=0 at t=0

a consist of curves in two different planes joined together at a point where k=0.

Q no. 4) let a(s) be a unit speed curve

A) prove that the tangent spherical image of alpha (a) is a constant curve iff. a is straight line.

B) prove that the binormal spherical image of a is a constant curve iff. a is a plane curve.

C) prove that the normal spherical image of a is never constant.

Qno. 6 ) let a(s) be a unit speed curve k>0 . Let s star be arc length on the normal spherical image. Prove k= | ds star /ds| iff. a (alpha) is a plane curve.

if A = 5t2 + tj-t3k and B = sin t1-costj evaluate d/dt (AXB)

Prove that The transition maps of a smooth surface are smooth.

Prove that If γ(t)=σ(u(t),v(t)) is a unit speed curve on a surface patch σ, its normal curvature is given by k_n=Lu ̇^2+2M(u ) ̇v ̇+Nv ̇^2

Where L〖du〗^2+2Mdudv+N〖dv〗^2 is the second fundamental form of σ.

Where L〖du〗^2+2Mdudv+N〖dv〗^2 is the second fundamental form of σ.

Q. Compute the normal curvature of the circle γ(t)=(cost, sint, 1) on the elliptic paraboloid

σ(u,v)=(u,v,u^2+v^2)

σ(u,v)=(u,v,u^2+v^2)

Q. Compute the first fundamental form and second fundamental form of the elliptical paraboloid σ(u,v)=(u, v,〖 u〗^2+v^2)

Q. Calculate the first fundamental forms of the following surfaces:

1) Sphere: σ(θ,φ) =(cosθcosφ, cosθsinφ,sinθ)

2) A generalized cylinder: σ(u,v) =γ(u)+Va

1) Sphere: σ(θ,φ) =(cosθcosφ, cosθsinφ,sinθ)

2) A generalized cylinder: σ(u,v) =γ(u)+Va

Q. How to cover a patch(patch of sphere)?

Define surface.

Q. The unit sphere S^2 defined by

σ(θ,φ) =(cosθcosφ,cosθsinφ,sinθ)

σ͂(θ,φ) =(-cosθcosφ,-sinθ,-cosθsinφ)

σ(θ,φ) =(cosθcosφ,cosθsinφ,sinθ)

σ͂(θ,φ) =(-cosθcosφ,-sinθ,-cosθsinφ)