Understanding Vector Span and Linear Combinations

Vector w must be perpendicular to vectors u and v.

Vector w must be a linear combination of vectors u and v.

Vector w must have the same magnitude as vectors u and v.

Vector w must be parallel to vectors u and v.

Vector w is the sum of vectors u and v.

Vector w is orthogonal to vectors u and v.

Vector w is a scalar multiple of vector u.

Vector w can be expressed as a sum of scalar multiples of vectors u and v.

As diagonal matrices

As scalar values

As column matrices

As row matrices

A 3x3 matrix

A 1x2 row matrix

A 2x2 matrix

A 2x1 column matrix

Writing an augmented matrix

Performing matrix multiplication

Finding the determinant

Calculating the inverse

To find the inverse of the matrix

To calculate the determinant

To determine the rank of the matrix

To solve for the scalars c1 and c2

4

5

6

7

Adding a row to itself

Dividing a row by its leading entry

Multiplying a row by -1

Swapping two rows

c1 = 5, c2 = 2

c1 = 7, c2 = -1

c1 = 1, c2 = 0

c1 = 3, c2 = 4

By ensuring vector w has the same magnitude as vectors u and v

By checking if vector w is orthogonal to vectors u and v

By expressing vector w as a linear combination of vectors u and v

By calculating the dot product of vector w with vectors u and v