Components of Vectors (DP IB Maths: AI HL)

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Components of Vectors

Why do we write vectors in component form?

  • When working with vectors in context it is often useful to break them down into components acting in a direction that is not one of the base vectors
  • The base vectors are vectors acting in the directions i, j and k
  • The vector will need to be resolved into components that are acting perpendicular to each other
  • Usually, one component will be acting parallel to the direction of another vector and the other will act perpendicular to the direction of the vector
  • For example: the components of a force parallel and perpendicular to the line of motion allows different types of problems to be solved
    • The parallel component of a force acting directly on a particle will be the component that causes an effect on the particle
    • The perpendicular component of a force acting directly on a particle will be the component that has no effect on the particle
  • The two components of the force will have the same combined effect as the original vector

 

How do we write vectors in component form?

  • Use trigonometry to resolve a vector acting at an angle
  • Given a vector a acting at an angle θ to another vector b
    • Draw a vector triangle by decomposing the vector a into its components parallel and perpendicular to the direction of the vector b
  • The vector a will be the hypotenuse of the triangle and the two components will make up the opposite and adjacent sides
  • The component of a acting parallel to b will be equal to the product of the magnitude of a and the cosine of the angle θ
    • The component of a acting in the direction of b equals |a|cos θ
    • This is equivalent to fraction numerator bold italic a times bold italic b over denominator vertical line bold italic b vertical line end fraction
  • The component of a acting perpendicular to b will be equal to the product of the magnitude of a and the sine of the angle θ
    • The component of a acting perpendicular to the direction of b equals |a|sin θ
    • This is equivalent to  fraction numerator vertical line bold italic a cross times bold italic b vertical line over denominator vertical line bold italic b vertical line end fraction
  • The formulae for the components using the scalar product and the vector product are particularly useful as the angle is not needed
  • The question may give you the angle the vector is acting in as a bearing
    • Bearings are always the angle taken from the north

3-7-6-ib-ai-hl-components-of-vectors-diagram-1

Exam Tip

  • If a question asks you to find a component of a vector it is a good idea to sketch a quick diagram so that you can visualise which vectors are going in which direction
    • This is especially important if the question involves forces

Worked example

A force with magnitude 10 N is acting on a bearing of 060° on an object which is moving with velocity vector v = 2i - 3j.

a)
By finding the components of the force in the i and j direction, write down the force as a vector.

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b)
Find the component of the force acting parallel to the direction of the object.

ysOarxyw_3-7-6-ib-ai-hl-components-of-vectors-we-sol-b

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Author: Amber

Amber gained a first class degree in Mathematics & Meteorology from the University of Reading before training to become a teacher. She is passionate about teaching, having spent 8 years teaching GCSE and A Level Mathematics both in the UK and internationally. Amber loves creating bright and informative resources to help students reach their potential.