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Linear Algebra and Its Applications | 5th Edition | ISBN: 9780321982384 | Authors: David C. Lay; Steven R. Lay; Judi J. McDonald
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Solved: a. Show that the set S is affinely independent.b.

Chapter 8, Problem 15E

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QUESTION:

a. Show that the set S is affinely independent.b. Find the barycentric coordinates of with respect to S.c. Let T be the triangle with vertices v1, v2, and v3. When the sides of T are extended, the lines divide R2 into seven regions. See Fig. 8. Note the signs of the barycentric coordinates of the points in each region. For example, p5 is inside the triangle T and all its barycentric coordinates are positive. Point p1 has coordinates (–, +, +) Its third coordinate is positive because p1 is on the v3 side of the line through v1 and v2. Its first coordinate is negative because p1 is opposite the v1 side of the line through v2 and v3. Point p2 is on the v2v3 edge of T . Its coordinates are (0, +, +). Without calculating the actual values, determine the signs of the barycentric coordinates of points p6, p7, and p8 as shown in Fig. 8.

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QUESTION:

a. Show that the set S is affinely independent.b. Find the barycentric coordinates of with respect to S.c. Let T be the triangle with vertices v1, v2, and v3. When the sides of T are extended, the lines divide R2 into seven regions. See Fig. 8. Note the signs of the barycentric coordinates of the points in each region. For example, p5 is inside the triangle T and all its barycentric coordinates are positive. Point p1 has coordinates (–, +, +) Its third coordinate is positive because p1 is on the v3 side of the line through v1 and v2. Its first coordinate is negative because p1 is opposite the v1 side of the line through v2 and v3. Point p2 is on the v2v3 edge of T . Its coordinates are (0, +, +). Without calculating the actual values, determine the signs of the barycentric coordinates of points p6, p7, and p8 as shown in Fig. 8.

ANSWER:

Solution 15E(a)Suppose the set, S, where The objective is to show that is affinely independent.Compute the following points,-Suppose there exist a scalar c such that - That is Equating corresponding coordinates, The value of c must be unique.Since - is not a multiple of - , the points ,, are linearly independent.Therefore, the set S is affinely independent.b)The barycentric c

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