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Differential Geometry | Topology

Find the curvature, the radius and the center of curvature at a point.

r=1+ cos theta ,theta=Ï€/2

Differential Geometry | Topology

Find killing equations for spherical polar coordinates

Differential Geometry | Topology

DG. Let X be the universal space. Which set is equal to "\\mathrm{Cl}(X) \\cap \\mathrm{Cl}(X \\backslash A) ?(\\mathrm{Fr}" stands for the boundary of a set, "\\mathrm{Cl}" means the closure of a set).

Differential Geometry | Topology

"\\text { Find the interior Int }\\left\\{\\frac{1}{n} \\mid n \\in \\mathbb{N}\\right\\} \\text { of a subset of } \\mathbb{R} \\text {. }" (DG)

Differential Geometry | Topology

"\\text { Find the limit points of }\\left\\{\\frac{1}{n} \\mid n \\in \\mathbb{N}\\right\\} \\text { in } \\mathbb{R} \\text {. }" (DG)

Differential Geometry | Topology

Find the evolute of

x

2

a2

âˆ’

y

2

b

2

= 1 as the envelope of the normals.

Differential Geometry | Topology

4. Find the evolute of the rectangular hyperbola y

2 = 4ax. Ans: 27ay2 = 4(x âˆ’

2a)

3

Hint: Take P (at2

, 2at) be any point on the parabola.

5. Find the envelope of the family of lines of the form y = mxÂ±

âˆšï¸€

a2m2 âˆ’ b

2. Ans:

x

2

a2

âˆ’

y

2

b

2

= 1

6. Find the envelope of the family of lines of the form

x

a

+

y

b

= 1 subject to the

condition a + b = 1. Ans: âˆš

x +

âˆš

b = 1

7. Find the evolute of

x

2

a2

+

y

2

b

2

= 1 as the envelope of the normals. Ans: (ax)

2/3 +

(by)

2/3 = (a

2 âˆ’ b

2

)

2/3

Differential Geometry | Topology

1. Find the radius of curvature (ROC) at (a cos3 Î¸, a sin3

Î¸) on the curve x

2/3 +

y

2/3 = a

2/3

2. Find the radius of curvature (ROC) for the curve x = a(cos Î¸ + Î¸ sin Î¸), y =

a(sin Î¸ âˆ’ Î¸ cos Î¸).

Differential Geometry | Topology

find the radius of the curvature at (acostheta^3,asintheta^3) on the curve x^2/3+y^2/3=a^2/3

Differential Geometry | Topology

Find

the Curvature and

torsion of the Curves r = (u, (1 + u)/u, (1 - u ^ 2)/u)