Presentation is loading. Please wait.

Presentation is loading. Please wait.

Parametric Surfaces and their Area Part II. Parametric Surfaces – Tangent Plane The line u = u 0 is mapped to the gridline C 2 =r(u 0,v) Consider the.

Published bySilvester Garrison Modified over 9 years ago

Similar presentations

Presentation on theme: "Parametric Surfaces and their Area Part II. Parametric Surfaces – Tangent Plane The line u = u 0 is mapped to the gridline C 2 =r(u 0,v) Consider the."— Presentation transcript:

1 Parametric Surfaces and their Area Part II

2 Parametric Surfaces – Tangent Plane The line u = u 0 is mapped to the gridline C 2 =r(u 0,v) Consider the parametric surface defined over some domain D. The line v = v 0 is mapped to the gridline C 1 =r(u,v 0 )

3 Parametric surfaces – Tangent Plane We can use this fact to find the equation of the tangent plane to a parametric surface at a given point. Thus the normal vector to the tangent plane is Cartesian coordinates of the point corresponding to u = 2, Example 6: Find the equation of the tangent plane to Equation of tangent plane: 0(x−0) − 2(y − 2)+2(z − 2)=0 Note that the surface is a cone. Can you see that from the parametric equations?

4 Parametric Surfaces – Surface Area Consider the parametric surface S described by the equation defined over some domain D.

5 Area of the surface S is Parametric Surfaces and their area

6 Parametric Surfaces and their area – Example 7 Find the surface area of the helicoid

7 Parametric Surfaces and their area – Example 8 Find the surface area of a sphere of radius a The sphere can be parameterized by We then have: =1

8 Parametric Surfaces and their area Surface Area:

9 Parametric Surfaces and their area – Example 9 Since z is positive, the surface can be written in explicit form as Find the curve C of intersection:

10 Parametric Surfaces and their area – Example 9 continued Changing to polar coordinates:

11 on the domain Parametric Surfaces and their area – Example 10

Download ppt "Parametric Surfaces and their Area Part II. Parametric Surfaces – Tangent Plane The line u = u 0 is mapped to the gridline C 2 =r(u 0,v) Consider the."

Similar presentations

Warm Up.

Warm Up.
Vector Functions and Space Curves

Vector Functions and Space Curves
Objectives Write equations and graph circles in the coordinate plane.

Objectives Write equations and graph circles in the coordinate plane.
Chapter : Differentiation. Questions 1. Find the value of Answers (1) 2. If f(x) = 2[2x + 5]⁴, find f ‘ (-2) Answers(2) 3. If y = 2s⁶ and x = 2s – 1,

Chapter : Differentiation. Questions 1. Find the value of Answers (1) 2. If f(x) = 2[2x + 5]⁴, find f ‘ (-2) Answers(2) 3. If y = 2s⁶ and x = 2s – 1,
Tangent Lines ( Sections 1.4 and 2.1 ) Alex Karassev.

Tangent Lines ( Sections 1.4 and 2.1 ) Alex Karassev.
Chapter 9: Vector Differential Calculus 1 9.1. Vector Functions of One Variable -- a vector, each component of which is a function of the same variable.

Chapter 9: Vector Differential Calculus Vector Functions of One Variable -- a vector, each component of which is a function of the same variable.
The gradient as a normal vector. Consider z=f(x,y) and let F(x,y,z) = f(x,y)-z Let P=(x 0,y 0,z 0 ) be a point on the surface of F(x,y,z) Let C be any.

The gradient as a normal vector. Consider z=f(x,y) and let F(x,y,z) = f(x,y)-z Let P=(x 0,y 0,z 0 ) be a point on the surface of F(x,y,z) Let C be any.
POLAR COORDINATES. There are many curves for which cartesian or parametric equations are unsuitable. For polar equations, the position of a point is defined.

POLAR COORDINATES. There are many curves for which cartesian or parametric equations are unsuitable. For polar equations, the position of a point is defined.
Tangent Vectors and Normal Vectors. Definitions of Unit Tangent Vector.

Tangent Vectors and Normal Vectors. Definitions of Unit Tangent Vector.
MAT 128 1.0 Math. Tools II Tangent Plane and Normal Suppose the scalar field  =  ( x, y, z, t) at time t o, the level surfaces are given by  ( x, y,

MAT Math. Tools II Tangent Plane and Normal Suppose the scalar field  =  ( x, y, z, t) at time t o, the level surfaces are given by  ( x, y,
Parametric Surfaces.

Parametric Surfaces.
Objects in 3D – Parametric Surfaces Computer Graphics Seminar MUM, summer 2005.

Objects in 3D – Parametric Surfaces Computer Graphics Seminar MUM, summer 2005.
17 VECTOR CALCULUS.

17 VECTOR CALCULUS.
Chapter 16 – Vector Calculus

Chapter 16 – Vector Calculus
Multiple Integrals 12. Surface Area 12.6 3 Surface Area In this section we apply double integrals to the problem of computing the area of a surface.

Multiple Integrals 12. Surface Area Surface Area In this section we apply double integrals to the problem of computing the area of a surface.
X y z Point can be viewed as intersection of surfaces called coordinate surfaces. Coordinate surfaces are selected from 3 different sets.

X y z Point can be viewed as intersection of surfaces called coordinate surfaces. Coordinate surfaces are selected from 3 different sets.
Section 10.4 – Polar Coordinates and Polar Graphs.

Section 10.4 – Polar Coordinates and Polar Graphs.
Vectors: planes. The plane Normal equation of the plane.

Vectors: planes. The plane Normal equation of the plane.
Integration in polar coordinates involves finding not the area underneath a curve but, rather, the area of a sector bounded by a curve. Consider the region.

Integration in polar coordinates involves finding not the area underneath a curve but, rather, the area of a sector bounded by a curve. Consider the region.
Lecture 19: Triple Integrals with Cyclindrical Coordinates and Spherical Coordinates, Double Integrals for Surface Area, Vector Fields, and Line Integrals.

Lecture 19: Triple Integrals with Cyclindrical Coordinates and Spherical Coordinates, Double Integrals for Surface Area, Vector Fields, and Line Integrals.

Similar presentations

Ads by Google