EBK MATHEMATICS FOR MACHINE TECHNOLOGY
8th Edition
ISBN: 9781337798396
Author: SMITH
Publisher: CENGAGE LEARNING - CONSIGNMENT
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Chapter 14, Problem 9A
Raise the following numbers to the indicated power.
9.
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1. True or false:
(a) if E is a subspace of V, then dim(E) + dim(E) = dim(V)
(b) Let {i, n} be a basis of the vector space V, where v₁,..., Un are all eigen-
vectors for both the matrix A and the matrix B. Then, any eigenvector of A is
an eigenvector of B.
Justify.
2. Apply Gram-Schmidt orthogonalization to the system of vectors {(1,2,-2), (1, −1, 4), (2, 1, 1)}.
3. Suppose P is the orthogonal projection onto a subspace E, and Q is the orthogonal
projection onto the orthogonal complement E.
(a) The combinations of projections P+Q and PQ correspond to well-known oper-
ators. What are they? Justify your answer.
(b) Show…
1. True or false:
(a) if E is a subspace of V, then dim(E) + dim(E+) = dim(V)
(b) Let {i, n} be a basis of the vector space V, where vi,..., are all eigen-
vectors for both the matrix A and the matrix B. Then, any eigenvector of A is
an eigenvector of B.
Justify.
2. Apply Gram-Schmidt orthogonalization to the system of vectors {(1, 2, -2), (1, −1, 4), (2, 1, 1)}.
3. Suppose P is the orthogonal projection onto a subspace E, and Q is the orthogonal
projection onto the orthogonal complement E.
(a) The combinations of projections P+Q and PQ correspond to well-known oper-
ators. What are they? Justify your answer.
(b) Show that P - Q is its own inverse.
4. Show that the Frobenius product on n x n-matrices,
(A, B) =
= Tr(B*A),
is an inner product, where B* denotes the Hermitian adjoint of B.
5. Show that if A and B are two n x n-matrices for which {1,..., n} is a basis of eigen-
vectors (for both A and B), then AB = BA.
Remark: It is also true that if AB = BA, then there exists a common…
Chapter 14 Solutions
EBK MATHEMATICS FOR MACHINE TECHNOLOGY
Ch. 14 - Subtract 7516278 .Ch. 14 - Multiply 7238 . Express the result as a mixed...Ch. 14 - Multiply 1.7022.35 .Ch. 14 - Use Figure 14-5 to answer Exercises 4 through 6....Ch. 14 - Use Figure 14-5 to answer Exercises 4 through 6....Ch. 14 - Use Figure 14-5 to answer Exercises 4 through 6....Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...
Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - Raise the following numbers to the indicated...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the lengths of the sides...Ch. 14 - In the following table, the radii of circles are...Ch. 14 - In the following table, the radii of circles are...Ch. 14 - In the following table, the radii of circles are...Ch. 14 - In the following table, the radii of circles are...Ch. 14 - In the following table, the radii of circles are...Ch. 14 - In the following table, the diameters of spheres...Ch. 14 - In the following table, the diameters of spheres...Ch. 14 - In the following table, the diameters of spheres...Ch. 14 - In the following table, the diameters of spheres...Ch. 14 - In the following table, the diameters of spheres...Ch. 14 - In the following table, the radii and heights of...Ch. 14 - In the following table, the radii and heights of...Ch. 14 - In the following table, the radii and heights of...Ch. 14 - In the following table, the radii and heights of...Ch. 14 - In the following table, the radii and heights of...Ch. 14 - In the following table, the diameters and heights...Ch. 14 - In the following table, the diameters and heights...Ch. 14 - In the following table, the diameters and heights...Ch. 14 - In the following table, the diameters and heights...Ch. 14 - Prob. 55ACh. 14 - Prob. 56ACh. 14 - Prob. 57ACh. 14 - Find the area of this plate. All dimensions are in...Ch. 14 - Find the metal volume of this bushing. All...Ch. 14 - Find the volume of this pin. All dimensions are in...Ch. 14 - Prob. 61A
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- Question 1. Let f: XY and g: Y Z be two functions. Prove that (1) if go f is injective, then f is injective; (2) if go f is surjective, then g is surjective. Question 2. Prove or disprove: (1) The set X = {k € Z} is countable. (2) The set X = {k EZ,nЄN} is countable. (3) The set X = R\Q = {x ER2 countable. Q} (the set of all irrational numbers) is (4) The set X = {p.√2pQ} is countable. (5) The interval X = [0,1] is countable. Question 3. Let X = {f|f: N→ N}, the set of all functions from N to N. Prove that X is uncountable. Extra practice (not to be submitted). Question. Prove the following by induction. (1) For any nЄN, 1+3+5++2n-1 n². (2) For any nЄ N, 1+2+3++ n = n(n+1). Question. Write explicitly a function f: Nx N N which is bijective.arrow_forward3. Suppose P is the orthogonal projection onto a subspace E, and Q is the orthogonal projection onto the orthogonal complement E. (a) The combinations of projections P+Q and PQ correspond to well-known oper- ators. What are they? Justify your answer. (b) Show that P - Q is its own inverse.arrow_forwardDetermine the moment about the origin O of the force F4i-3j+5k that acts at a Point A. Assume that the position vector of A is (a) r =2i+3j-4k, (b) r=-8i+6j-10k, (c) r=8i-6j+5karrow_forward
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