Understanding Nontrivial Solutions in Linear Algebra: Debunking the False Statement about Ax=0

If x is a nontrivial solution of Ax=0, then every entry in x is nonzero.Is the statement true or false?

The statement is false

The statement is false.

A nontrivial solution of Ax=0 means that there exists a vector x which is not the zero vector, such that when multiplied by the matrix A, the resulting vector is the zero vector.

In other words, Ax=0 implies that there is at least one entry in vector x that is nonzero.

However, this does not mean that every entry in x is nonzero. It is possible to have some entries in x equal to zero while still satisfying the equation Ax=0.

Therefore, the statement is false.

More Answers:

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Understanding the Relationship between Row Space and Column Space of a Matrix: Exploring the Equivalence of row(A^T) and col(A)

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