If vector u = (5, 3) and vector v = (-1, 4), what is the component form of vector u + v?
The component form of vector u + v is obtained by adding the corresponding components of vector u and vector v.
Adding the corresponding components:
- u + v = (5 + (-1), 3 + 4)
= (4, 7)
Thus, the component form of vector u + v is (4, 7).
To find the component form of the sum of two vectors, we add the corresponding components.
Given that vector u = (5, 3) and vector v = (-1, 4), the sum of these vectors can be found by adding the corresponding components:
u + v = (5 + (-1), 3 + 4)
= (4, 7)
Therefore, the component form of vector u + v is (4, 7).
To find the component form of vector u + v, you need to add the corresponding components of the vectors.
Given vector u = (5, 3) and vector v = (-1, 4), you can add their respective components:
u + v = (5 + (-1), 3 + 4)
= (4, 7)
Therefore, the component form of vector u + v is (4, 7).