Please finish these exercise

Math 120 Homework 11: Problem 7 (1 point) Which of the following sets of vectors are linearly independent? JA. { ( 8, 5, -7 ), (-2, -8, 4 ), (-10, 11, -13 ), (8, 11, --10 ) } J B. { ( 6, 1, -9 ), (1, -3, -5) } DC. { (-7, -2), (-8, 4), (-5, -9) } DD. { (3, -6) } DE. { ( 1, 7), (2, -1 ) } OF. { (8, -4), (0, 0) } OG. { (0, 0) } OH. { ( 4, -1, 1, -9 ), (1, -7, -8, -2) }Math 120 Homework 11: Problem 8 (1 point) Let A = Are A,B and C linearly dependent, or are they linearly independent? O Linearly independent Linearly dependent If they are linearly dependent, determine a non-trivial linear relation. Otherwise, if the vectors are linearly independent, enter O's for the coefficients, since that relationship always holds. 0 A+ 1 B+ 1 0 = 0.Math 120 Homework 11: Problem 17 (1 point) Let 16 01 = 20 8 Are the vectors v1, 12 and 13 linearly independent? linearly dependent v If the vectors are independent, enter zero in every answer blank since zeros are only the values that make the equation below true. If they are dependent, find numbers, not all zero, that make the equation below true. You should be able to explain and justify your answer.Math 120 Homework 11: Problem 11 (1 point) 32 Are the vectors and linearly independent? -2 linearly independent v If they are linearly dependent, find scalars that are not all zero such that the equation below is true. If they are linearly independent, find the only scalars that will make the equation below true. 32Math 120 Homework 10: Problem 1 (1 point) -201 Let u = -24 We want to determine if one of {u, v, w} is in the span of the others. To do that we write the vectors as columns of a matrix A and row reduce that matrix. To check this we add times the first row to the second. We then add times the first row to the third. We then add times the new second row to the new third row. We conclude thatMath 120 Homework 12: Problem 15 (1 point) Find a basis of the subspace of R* defined by the equation -7c1 - 5:2 + 2x3 = 0. Basis