Consider the surface S, given by the parameterization:
And consider the claims:
S is smooth in all its points.
S matches the graph of the equation 
Select one:
a. Only (2) is true.
b. Both are false.
c. They are both true.
d. Only (1) is true.
Homework Answers
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please thumbs up for this solution.. thanks..
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2nd is false .. and 1st is true ...
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answer = option d) ,.. only (1) is true
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Consider the surface S, given by the parameterization:
And consider the claims:
S is smooth in...
7. (a) Consider the rectangle S in R3 with vertices (0,0,0), (1, 1,o), (a.1,2), and (0,0,2). Give...
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7. (a) Consider the rectangle S in R3 with vertices (0,0,0), (1, 1,o), (a.1,2), and (0,0,2). Give a parameterization of S of the form r(u, v) where 0susland 0s v s1. (2 points) 2 1,2) 刁ㄚ r(u, u) = , u
7. (a) Consider the rectangle S in R3 with vertices (0,0,0), (1, 1,o), (a.1,2), and (0,0,2). Give a parameterization of S of the form r(u, v) where 0susland 0s v s1. (2...
10. Consider the surface S parameterized by w r= (cos y, sin v, u + sin...
10. Consider the surface S parameterized by w r= (cos y, sin v, u + sin v), -3 <u <3, 050 < 27 *** (a) Write a linear equation for the tangent plane to the surface at (0,1,1) (b) Compute the surface area of S.
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Figure 1 : Boundary layer over a flat plate
Consider air flows with velocity of U?=U=10 m/s over a
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I can't follow the answer please explain.
7. (a) Consider the rectangle S in R3 with vertices (0,0,0), (1, 1,o), (a.1,2), and (0,0,2). Give a parameterization of S of the form r(u, v) where 0susland 0s v s1. (2 points) 2 1,2) 刁ㄚ r(u, u) = , u
7. (a) Consider the rectangle S in R3 with vertices (0,0,0), (1, 1,o), (a.1,2), and (0,0,2). Give a parameterization of S of the form r(u, v) where 0susland 0s v s1. (2...
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12. Given that F(x,y,z) = 6x?i + 1829 + 36x?yk and that S is the surface 7(u, v) = ui + 2vſ + Zuvk where 0 su s 1 and 0 sv<2, compute the flux •ds of the vector field † through the surface S oriented in the upward direction. (4 points)
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Can anyone help with this question please?
Given a domain Ω c R2 and a smooth function f,uo : Ω-+ R consider the problem Uz (x, t)-Au (x, t) + u(x, t) u(x, t = f(x) Y(x, t) E Ω × (0, oo), V(x, t) E 2 x (0, 00), Assume that u(z, t) is a smooth solution and that v(x) is a smooth stationary (i.e., time-independent) solution. Derive a PDE problem for the difference w(x, t)u(x, t)(x) By multiplying...
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6. Consider the sphere S cut out by z2 + y2 22. Maximize (Daf)P where y, z) 2y +3z and u is a unit vector in the tangent plane to S at the point (A) v3 (E) 2v3 (B) 1+2V2 (C) 2 v3 (G) 3/2 (D) V2
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te tt 9 Let S be the surface defined by r2 y-22= 1 and 0 15 points by the normal direction toward the z-axis. Find the flux of the velocity field V 1and oriented (z2-ry2)i+(2.2y -yz2)j+ (y2z- 2r2)k across S Solution. To use Gauss Theorem, define C and C2 such that C1 {(a, y, z ) | a + y? < 2, z = 1} C2={(r,y,)| +y1.0} 11 TALK X W P S ww F6 & # 2 3 4...
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