In parts (a) through (e) below, mark the given statement as True or False. Justify each answer. All vectors are in set of real numbers R Superscript nℝn. a. vtimes•vequals=Bold left norm v right normvsquared2 Choose the correct answer below. A. The given statement is false. It is not possible for it to be true because vtimes•v simplifies to a vector, whereas Bold left norm v right normvsquared2 simplifies to a scalar. B. The given statement is true. By the definition of the length of a vector v, Bold left norm v right normvequals=StartRoot Bold v times Bold v EndRootv•v. C. The given statement is false. By the definition of the length of a vector v, Bold left norm v right normvequals=vtimes•v. It follows that Bold left norm v right normvsquared2equals=(vtimes•v)squared2. D. The given statement is true. By the definition of the length of a vector v, Bold left norm v right normvequals=vtimes•v. It follows that Bold left norm v right normvsquared2equals=(vtimes•v)squared2.

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cdchavezq cdchavezq · Answer 1 · 2020-05-05T04:40:17+02:00

Answer:

(c)

"The given statement is true, by definition of length of a vector [tex]v[/tex], [tex]||v|| = \sqrt{v\bullet v}[/tex]"

Step-by-step explanation:

(a) [tex]v \bullet v = || v ||^2[/tex]

That is completely correct Remember that if [tex]v = (x_1,x_2,x_3)\\[/tex] then

[tex]v \bullet v = x_1*x_1+x_2*x_2+x_3*x_3 = x_1^2+x_2^2+x_3^2 = ||v||^2[/tex]

Therefore the correct answer would be (c).

"The given statement is true, by definition of length of a vector [tex]v[/tex], [tex]||v|| = \sqrt{v\bullet v}[/tex]"