Linear Algebra 2
posted by Sower II .
Let V and W be vector spaces over a field and let T:V>W be a linear transformation then V/kerT =R(T)
(A) True
(B) False
(C) Indifference
(D) None of the above
(A) (B) (C) (D)
Respond to this Question
Similar Questions

Linear Algebra
a)Let v be a fixed vector in R^3. Show that the transformation defined by T(u)=vxu is a linear transformation. b)Find the range of this linear transformation. Thanx 
algebra
If v1,...,v4 are in R^4 and v3 is not a linear combination of v1, v2, v4 then {v1, v2, v3, v4] is linearly independent. Is this true or false? 
Algebra
Determine if the relationship represented in the table is linear. If it is linear, write an equation. x 2 5 7 10 12 20 y 3 0 2 5 7 15 A) Linear; y = x  5 B) Linear; y = 5x C) Linear; y = x + 5 D) Not linear I'm thinking it's C … 
Algebra
For which table(s) of values in Exercises 39–42 is the relationship linear? 
Linear Alebra
Show that the transformation T:R^2>R^2 given T(x1,x2)=(3x15x2,x1+2x2) is linear by verifying that satisfies the definition of linear. 
Linear Algebra
(1) Define T:R>R be a linear transformation such that T(x,y,z)= (2x,2y,2z) then the given value of T is A. 3 B. 2 C. 4 D. 6 (A) (B) (C) (D) (2) Let V and W be vector spaces over a field F, and let T:V> W be a linear transformation … 
Algebra
1. What is the mapping of? Domain Range 3 3 2 6 1 0, 15 0 6 1 1 I needed to represent these with arrows, but I can't. a. relation b. linear function c. all of these d. none of these Answer none of these 2. Rewrite 2x  3y < 
Discrete Math
True or False? Homogeneous linear recurrence equations are linear combinations of power functions. I think the answer is false because although a homogeneous linear recurrence equation is a linear combination, it is composed of constant 
Linear Algebra
Consider the linear transformation T: R^3>R^3 which acts by rotation around the yaxis by an angle of pi, followed by a shear in the xdirection by a factor of 2. a) Find the matrix for T. Explain your method. b) What is T(1,2,3) … 
Linear Algebra
Hello, could anyone help me with this excersise of linear algebra, Please?