1) Find the rank of A 2) Find the dimensions of Nul(A) and Col(A) 3) How...
Question 3. (20 pts) Let A= -3 9-27 2 -6 4 8 3 -9 -2 2 Find a basis for Col(A) and a basis for Nul(A). Question 4. (15 pts) Let the matrix A be the same as in Question 3. (1). Find the rank of A. (2). Find the dimensions of Nul(A) and Col(A). (3). How do the dimensions of Nul(A) and Col(A) relate to the number of columns of A?
A= 9 2 3 -9 -2 Question 4. (15 pts) Let the matrix A be the same as in Question 3 (1). Find the rank of A. (2). Find the dimensions of Nul(A) and Col(A). (3). How do the dimensions of Nul(A) and Col(A) relate to the number of columns of A?
Question 3. (20 pts) Let A= -3 9-27 2 -6 48 3 -9 -2 2 Question 4. (15 pts) Let the matrix A be the same as in Question 3 (1). Find the rank of A (2). Find the dimensions of Nul(A) and (0) (3). How do the dimensions of Nul(A) and Call relate to the mber of columns of A?
Find a basis for Col(A) and a basis for Nul(A)
Question 3. (20 pts) Let A= 3 9-27 2-6 18 3 9 -2 2 Find a basis for Col(A) and a basis for Nul(A).
Determine the dimensions of Nul A and Col A for the matrix shown below. 1 5 9 0 7 6 3 A= 0 1 4 0 4 2 5 The dimension of Nul A is and the dimension of Col A is
Determine the dimensions of Nul A and Col A for the matrix shown below. A= 130 5 4 3 0 1 0 -446 000 1 2 3 The dimension of Nul A is and the dimension of Col A is
Determine the dimensions of Nul A and Col A for the matrix shown below. 1 4 -4 3-3 6 - 1 0 0 0 0 00 0 A= 0 0 0 0 0 0 0 0 0 0 0 0 0 0 The dimension of Nul A is and the dimension of Col A is
b) fina rank A and basis for col A
c) find basis for Nul A
Ti 2017 Let A = 2 3 1 1 3 5 1 2 Find the reduced row echelon form of A.
please calculate Nul A and dimension of Col A
find invertible matrix p and c
there are two questions. try and answer them. it is
straight forward and clear
Determine the dimensions of Nul A and Col A for the matrix shown below. 0 0 A= 1 2 -4 5 -2 6 - 1 0 0 0 0 0 00 0 0 0 0 0 0 0 0 0 0 0 0 0 The dimension of Nul A is and...
For the matrix A below, find a nonzero vector in Nul A and a nonzero vector in Col A. 2 3 8-11 A=1-6-6-12 18 4 -3 -20 23 A matrix A and an echelon form of A are shown below. Find a basis for Col A and a basis for Nul A 1 2 02 A=177-21 351~1013-3 3 4 -6 12 3 3 -9 15