Answer to Question #222320 in Linear Algebra for anto

Consider the linear function "f:\\R^3\u2192\\R^3,\\ f(x,y,z)=(x-z,y-x,z-y)." .

i) Let us find the kernel of "f:"

"ker f=\\{(x,y,z)\\in R^3,\\ f(x,y,z)=(0,0,0)\\}\\\\\n=\\{(x,y,z)\\in R^3,\\ (x-z,y-x,z-y)=(0,0,0)\\}\\\\\n=\\{(x,y,z)\\in R^3,\\ x-z=0,y-x=0,z-y=0\\}\\\\\n=\\{(x,y,z)\\in R^3,\\ x=y=z\\}\\\\\n=\\{(x,x,x),\\ x\\in \\R\\}\\\\\n=\\{x(1,1,1),\\ x\\in \\R\\}"

ii) It follows that the vector "(1,1,1)" form a basis of the kernel, and hence the nulllity of "f" is 1.

iii) Let the vector "(a,b,c)" belongs to the range of "f." Then "f(x,y,z)=(x-z,y-x,z-y)=(a,b,c)" for some "(x,y,z)\\in\\R^3." It follows that "x-z=a,y-x=b,z-y=c." Then "(x-z)+(y-x)=a+b,z-y=c," that is "-z+y=a+b,z-y=c." We conclude that "a+b=-c." Since "(a,b,c)=(a,b,-(a+b))=a(1,0,-1)+b(0,1,-1)," and by the rank-nullity theorem "rank f=3-1=2," we conclude that "\\{(1,0,-1),(0,1,-1)\\}" is a basis of for the range "f".