The definition of the product of two vectors is:1This is called the dot product. Notice the answer is just a number NOT a vector.

The dot product is useful for several things. One of the important uses is in a formula for finding the angle between two vectors that have the same initial point.uvTechnically there are two angles between these vectors, one going the "shortest" way and one going around the other way. We are talking about the smaller of the two.

Find the angle between the vectors v = 3i + 2j and w = 6i + 4jThe vectors have the same direction. We say they are parallel because remember vectors can be moved around as long as you don't change magnitude or direction.What does it mean when the angle between the vectors is 0?

Determine whether the vectors v = 4i - j and w = 2i + 8j are orthogonal.The vectors v and w are orthogonal.If the angle between 2 vectors is , what would their dot product be? Since cos is 0, the dot product must be 0. compute their dot product and see if it is 0w = 2i + 8jv = 4i - j

The work W done by a constant force F in moving an object from A to B is defined asA use of the dot product is found in the formula below:This means the force is in some direction given by the vector F but the line of motion of the object is along a vector from A to B

Find the work done by a force of 50 kilograms acting in the direction 3i + j in moving an object 20 metres from (0, 0) to (20, 0).3i + j(20, 0)20i + 0jLet's find a unit vector in the direction 3i + jRemember to get a unit vector, divide a vector by it's magnitudeOur force vector is in this direction but has a magnitude of 50 so we'll multiply our unit vector by 50.

Acknowledgement

I wish to thank Shawna Haider from Salt Lake Community College, Utah USA for her hard work in creating this PowerPoint.

www.slcc.edu

Shawna has kindly given permission for this resource to be downloaded from www.mathxtc.com and for it to be modified to suit the Western Australian Mathematics Curriculum.

Stephen CorcoranHead of MathematicsSt Stephens School Carramarwww.ststephens.wa.edu.au