Finding Vector Paths (Cambridge (CIE) IGCSE Maths)

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Finding Vector Paths

How do I find the vector between two points?

  • A vector path is a path of vectors taking you from a start point to an end point

  • The following grid is made up entirely of parallelograms

    • The vectors a and b defined as marked in the diagram:

      • Any vector that goes horizontally to the right along a side of a parallelogram will be equal to a

      • Any vector that goes up diagonally to the right along a side of a parallelogram will be equal to b

Vectors on a grid of parallelograms
  • To find the vector between two points

    • Count how many times you need to go horizontally to the right

      • This will tell you how many a's are in your answer

    • Count how many times you need to go up diagonally to the right

      • This will tell you how many b's are in your answer

    • Add the a's and b's together

      • E.g. stack A R with rightwards arrow on top equals 2 bold a plus 3 bold b

  • You will have to put a negative in front of the vector if it goes in the opposite direction

    • -a is one length horizontally to the left

    • -b is one length down diagonally to the left

      • E.g. stack F B with rightwards arrow on top equals negative bold b plus bold a or stack F B with rightwards arrow on top equals bold a minus bold b

      • Likewise, stack B F with rightwards arrow on top equals negative stack F B with rightwards arrow on top equals negative open parentheses negative bold b plus bold a close parentheses equals bold b minus bold a

Vector paths on a grid
  • It is possible to describe any vector that goes from one point to another in the above diagram in terms of a and b

Examiner Tips and Tricks

  • Mark schemes will accept different correct paths, as long as the final answer is fully simplified

  • Check for symmetries in the diagram to see if the vectors given can be used anywhere else

Worked Example

The following diagram consists of a grid of identical parallelograms.

Vectors a and b are defined by bold a space equals space stack A B with rightwards arrow on top and bold b bold space equals space stack A F with rightwards arrow on top.

Vector parallelogram grid with vectors a and b shown.

Write the following vectors in terms of a and b.

a) stack A E with rightwards arrow on top

To get from A to E we need to follow vector a four times to the right 

table row cell stack A E with rightwards arrow on top space end cell equals cell space stack A B with rightwards arrow on top space plus thin space stack B C with rightwards arrow on top space plus space stack C D with rightwards arrow on top space plus space stack D E with rightwards arrow on top end cell row blank equals cell space bold a space plus bold space bold a space space plus space bold a space plus space bold a end cell end table

stack bold italic A bold italic E with bold rightwards arrow on top bold equals bold 4 bold a 

b) stack G T with rightwards arrow on top

There are many ways to get from G to T
One option is to go from to (b twice), and then from to (a three times) 

table row cell stack G T with rightwards arrow on top space end cell equals cell space stack G L with rightwards arrow on top space plus thin space stack L Q with rightwards arrow on top space plus space stack Q R with rightwards arrow on top space plus space stack R S with rightwards arrow on top space plus space stack S T with rightwards arrow on top end cell row blank equals cell bold italic b space plus space bold italic b space plus space bold italic a space plus space bold italic a space plus space bold italic a end cell end table

stack bold italic G bold italic T with bold rightwards arrow on top bold equals bold 3 bold a bold plus bold 2 bold b

c) stack E K with rightwards arrow on top

There are many ways to get from E to K
One option is to go fromto O (b twice), and then from O to ( -a four times)

table row cell stack E K with rightwards arrow on top space end cell equals cell space stack E J with rightwards arrow on top space plus thin space stack J O with rightwards arrow on top space plus space stack O N with rightwards arrow on top space plus space stack N M with rightwards arrow on top space plus space stack M L with rightwards arrow on top space plus space stack L K with rightwards arrow on top space space end cell row blank equals cell bold b space plus space bold b space minus space bold a space minus space bold a space minus space bold a bold space bold minus bold space bold a end cell end table

stack bold italic E bold italic K with bold rightwards arrow on top bold equals bold 2 bold italic b bold minus bold 4 bold italic a

negative 4 straight a plus 2 straight b is also acceptable

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Jamie Wood

Author: Jamie Wood

Expertise: Maths

Jamie graduated in 2014 from the University of Bristol with a degree in Electronic and Communications Engineering. He has worked as a teacher for 8 years, in secondary schools and in further education; teaching GCSE and A Level. He is passionate about helping students fulfil their potential through easy-to-use resources and high-quality questions and solutions.

Dan Finlay

Author: Dan Finlay

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Dan graduated from the University of Oxford with a First class degree in mathematics. As well as teaching maths for over 8 years, Dan has marked a range of exams for Edexcel, tutored students and taught A Level Accounting. Dan has a keen interest in statistics and probability and their real-life applications.