2. (a) Is the collection 1 2 linearly dependent or linearly independent? Justify. [2 (b)Describe (geometrically)...
2 2. Identify and Correct the Error. Describe geometrically the span of 5 -1/15] -1/6 in R3 1/10 Solution. The span of these two vectors is all the linear combinations of them, i.e. all 2 (-1/15) a 5 + b -1/6 1/10 for scalarsa, b. We have two vectors and two direction vectors span a plane. So the span of these two vectors is a plane with parametric equation: [-1/15) 5+t-1/6 with s,t real numbers. 1/10 BAD SOLUTION. The mistake...
Determine whether the following sets are linearly dependent or linearly indepen dent. If they are linearly dependent, find a subset that is linearly independent and has the same span (b) ((1,-1,2), (1,-2, 1), 1,4, 1)) in R3. (c) (1, 1,0), (1,0, 1), (0,1,1in (F2) (recall that F2-Z/2Z, the field with two elements).
Determine whether the given functions are linearly dependent or
linearly independent on the specified interval. Justify your
decision. Thank you!
Determine whether the given functions are linearly dependent or linearly independent on the specified interval. Justify your decision. {e 3*, e5x, 27x} on (-00,00) e Select the correct choice below and, if necessary, fill in the answer box to complete your choice. 3x 5x + =e and C2 A. The functions are linearly dependent because for constant values, C1 and...
a) they are linearly independent
b)they are linearly dependent
c)neither linearly dependent nor linearly independent
d)functions cannot be determined in real space x
e) none of them
(10,00 Puanlar) 2 14,(x) = [1 - Cos(2x)]. uz(x) = Sin?(x) fonksiyonlarının lincer bağımlı yada lineer bağımsız olup olmadıklarını inceleyiniz? a uneer olarak bagimsizdirlar by Lineer olarak bagimlidirlar. Ne lineer bagimline de lineer bagimsizdirlar d Fonksiyonlar, x-reel uzayında belirlenemezdirler c) Hiçbiri Once 2/ Soncalo > Kaput Swim
WURG Will Calculations: 4. Determine whether the vectors are linearly independent or are linearly dependent in R3. V1 = (-1,2, 1), v2 = (0,3,-2), V3 = (1,4,-1) Solution:
1. Determine whether or not the four vectors listed above are
linearly independent or linearly dependent.
If they are linearly dependent, determine a non-trivial linear
relation - (a non-trivial relation is three numbers which are not
all three zero.) Otherwise, if the vectors are linearly
independent, enter 0's for the coefficients, since that
relationship always holds.
(1 point) 13--3-3 Let vi = and V4 1-11 Linearly Dependent 1. Determine whether or not the four vectors listed above are linearly independent...
(3) Determine which of the following sets is linearly independent. 02-1 (a) If the set is linearly dependent, express one vector as a non-zero linear combination of the other vectors in the set. (b) If the set is linearly independent, show that the only linear combination of the above vectors which gives the zero vector is such that all scalars are zero. (c) For each of the sets, determine if the span of the vectors is the whole space, a...
747-38 1026 59% webwork.math.mcgill.ca Problem 5 linearly dependent linearly dependent At least one of the answers above is NOT correct. 15 o to O- 40 (1 point) Let Problem 6 Problem 7 Problem 8 Problem 9 Problem 10 Problem 11 Problem 12 Problem 13 Problem 14 Problem 15 Problem 16 Problem 17 15 B = 12 1-6 -9 -4 3 -101 -8 4 ] (a) Find the reduced row echelon form of the matrix B mref(B) = (b) How many...
(a). Determine whether the set is linearly dependent or independent. Further, if it is linearly dependent, express one of the polynomials as a linear combination of others. (b). Determine whether the set can be considered as a basis of the vector space P2, which is the set of all polynomials of degree not more than 2 under addition and scalar multiplication. (1). B = {1 – 2,1 – 22, x – x2} (Hint: Similar to the matrix case in last...