Chapter 18 Vectors and geometric proof
18.3 More Vector Arithmetic
The operation to add two or more vectors together to form a vector sum is known as the addition of vectors. The addition of vectors is done in two ways, either through triangle law or parallelogram law. Where the vector subtraction is: “The addition of a vector with the negative of another vector.” In this section, we learn about Representing Vectors, Magnitude Direction and Unit Vectors, How to determine the coordinates of midpoint of a vector, Vector navigation.
If you're a student in a school/college that's based in England, you might be entitled for full access to our eLearning platform where you can access to all our tutorial videos and practice questions.
Please check with the head of Maths or deputy headteacher at your school/college to request access if they've already registered to our free pilot subscription. They can always reach us at the below email:
maths@education-auditorium.co.uk
Note: Due to our safeguard and chilled protection policy; we wouldn't be able to respond to students enquiries directly.
The operation to add two or more vectors together to form a vector sum is known as the addition of vectors. The addition of vectors is done in two ways, either through triangle law or parallelogram law. Where the vector subtraction is: “The addition of a vector with the negative of another vector.” In this section, we learn about Representing Vectors, Magnitude Direction and Unit Vectors, How to determine the coordinates of midpoint of a vector, Vector navigation.
Using the resultant of two vectors to solve vector problems.
More Vector Arithmetic - Representing Vectors, Magnitude Direction and Unit Vectors, How to determine the coordinates of midpoint of a vector, Vector navigation.