Sub-topic: Modulus of a vector
Duration: 80 minutes
Learning Objectives: By the end of the lesson, students should be able to perform simple operations on vectors.
Reference Materials: New Further Mathematics Project 2 by M. R Tuttuh Adegun
Previous Knowledge: Students can perform arithmetic operations on vectors
Instructional Materials: Mathematical set.
MAGNITUDE OF A VECTOR
The magnitude of a vector a, sometimes called the modulus of the vector is represented by |a|.
Zero Vector: The zero vector is a vector with zero magnitude.
Unit Vector: The unit vector is the vector represented by a and is such that a = |a| a
Negative Vector: The negative vector of a is written as – a
Equality of vector: Two vectors are equal when they have same magnitude and direction.
UNIT VECTOR
ARITHMETIC OPERATIONS ON VECTORS
Example: If p = 2i – 3j; q = 3i + 5j and r = i + j; Find the values of
- 2p + q + 3r
- 3p – 2q
Solution
- 2p = 2(2i – 3j ) = 4i – 6j
3r = 3( i + j ) = 3i + 3j
Therefore; 2p + q + 3r = (4i – 6j) + (3i + 5j) + (3i + 3j)
= 10i + 2j
- 3p = 3(3i – 3j) = 9i – 9j
2q = 2(3i + 5j) = 6i + 10j
Therefore 3p – 2q = (9i – 9j) – (6i + 10j) =3i – 19j
Evaluation: New Further Mathematics Project 2, by M.R Tuttuh Adegun et al. Page 262, Exercise 14, no 5
Conclusion: Teacher summarizes the topic, marks the students’ notes, does correction and allows the students to copy.
Assignment: New Further Mathematics Project 2, by M.R Tuttuh Adegun et al. Page 262, Exercise 14, no 6
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