Determining whether this equation is a subspace?

  • Thread starter Thread starter Cottontails
  • Start date Start date
  • Tags Tags
    Subspace
Click For Summary
SUMMARY

The discussion centers on determining if the equation f''(x) + 3f'(x) + x^2 f(x) = sin(x) defines a subspace of the vector space F of all real functions. Participants clarify that an equation itself is not a subspace; rather, the set of functions satisfying the equation must be examined. The zero function, f(x) = 0 for all x, is identified as the zero vector in F, and it is confirmed that this function does not satisfy the equation when evaluated at x = 0, thus indicating that the set is not non-empty.

PREREQUISITES
  • Understanding of vector spaces and subspaces
  • Knowledge of differential equations and their properties
  • Familiarity with the concept of zero vectors in function spaces
  • Basic calculus, specifically derivatives of functions
NEXT STEPS
  • Study the properties of vector spaces and subspaces in functional analysis
  • Learn about the solutions to linear differential equations
  • Investigate the implications of the zero function in vector spaces
  • Explore the concept of linear combinations of functions and their relevance to subspaces
USEFUL FOR

Students and educators in mathematics, particularly those studying linear algebra and differential equations, as well as anyone interested in the properties of function spaces.

Cottontails
Messages
33
Reaction score
0

Homework Statement


There is a vector space with set F, of all real functions. It has the usual operations of addition of functions and multiplication by scalars. You have to determine whether this equation is a subspace of F: f''(x) + 3f'(x) + x^2 f(x) = sin(x)

Homework Equations


f''(x) + 3f'(x) + x^2 f(x) = sin(x) the 0 vector/function

The Attempt at a Solution


So, to test that it is non-empty set I used the 0 vector/function. However, is this the same as letting "x=0"? If so, it would then be:
f''(0) + 3f'(0) + x^2 f(0) = sin(0) and therefore 0 = 0 proving that the set is non-empty.
As, wouldn't it be what value also makes sin(x) = 0 (which is x=0) and so, would this be correct?
I just want to clarify whether it is before I continue further with solving the problem.
 
Physics news on Phys.org
Equations can't be subspaces. I assume that the problem is asking you to check if the set of solutions of the equation is a subspace of F. Note that this set is a subset of F.

The zero vector in F is the function that takes every x in ℝ to the number 0. You should verify that this function has the properties a zero vector is supposed to have.
 
Last edited:
Cottontails said:

Homework Statement


There is a vector space with set F, of all real functions. It has the usual operations of addition of functions and multiplication by scalars. You have to determine whether this equation is a subspace of F: f''(x) + 3f'(x) + x^2 f(x) = sin(x)
As Fredrik said, an equation is not a "subspace" what you want to determine is whether the set of all functions satisfying that equation is a subspace.

Homework Equations


f''(x) + 3f'(x) + x^2 f(x) = sin(x) the 0 vector/function

The Attempt at a Solution


So, to test that it is non-empty set I used the 0 vector/function. However, is this the same as letting "x=0"? If so, it would then be:
No, it is not, the 0 "function" is f(x)= 0 for all x.

f''(0) + 3f'(0) + x^2 f(0) = sin(0) and therefore 0 = 0 proving that the set is non-empty.
No, that is incorrect. You cannot set x= 0. If f(x)= 0 for all x, then its first and second derivatives are also 0 but the right hand side is not.

As, wouldn't it be what value also makes sin(x) = 0 (which is x=0) and so, would this be correct?
I just want to clarify whether it is before I continue further with solving the problem.
 

Similar threads

Vector Subspaces: Determining U as a Subspace of M4x4 Matrices
  • · Replies 8 ·
Replies
8
Views
2K
Determine whether the subset is a vector subspace
  • · Replies 12 ·
Replies
12
Views
2K
Determine whether ## S[y] ## has a maximum or a minimum
  • · Replies 18 ·
Replies
18
Views
3K
[Linear Alg] Determining which sets are subspaces of R[x]
  • · Replies 7 ·
Replies
7
Views
2K
Can this function still be a constant function?
  • · Replies 11 ·
Replies
11
Views
2K
[LinAlg] Set Notation, Subspaces, Bases, Ranges, & Kernels
  • · Replies 9 ·
Replies
9
Views
2K
Subspace theorem; differential equation for a subspace
  • · Replies 21 ·
Replies
21
Views
5K
Determining if a subset W is a subspace of vector space V
  • · Replies 8 ·
Replies
8
Views
2K
How should I find the equilibrium points and the general equation?
  • · Replies 3 ·
Replies
3
Views
2K
How should I show that all solutions are periodic?
  • · Replies 10 ·
Replies
10
Views
2K