Quadratic Functions (DP IB Maths: AA SL)

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Dan

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Quadratic Functions & Graphs

What are the key features of quadratic graphs?

  • A quadratic graph can be written in the form y equals a x squared plus b x plus c where a not equal to 0
  • The value of a affects the shape of the curve
    • If a is positive the shape is concave up
    • If a is negative the shape is concave down
  • The y-intercept is at the point (0, c)
  • The zeros or roots are the solutions to a x squared plus b x plus c equals 0
    • These can be found by
      • Factorising
      • Quadratic formula
      • Using your GDC
    • These are also called the x-intercepts
    • There can be 0, 1 or 2 x-intercepts
      • This is determined by the value of the discriminant
  • There is an axis of symmetry at x equals negative fraction numerator b over denominator 2 a end fraction
    • This is given in your formula booklet
    • If there are two x-intercepts then the axis of symmetry goes through the midpoint of them
  • The vertex lies on the axis of symmetry
    • It can be found by completing the square
    • The x-coordinate is x equals negative fraction numerator b over denominator 2 a end fraction
    • The y-coordinate can be found using the GDC or by calculating y when x equals negative fraction numerator b over denominator 2 a end fraction
    • If a is positive then the vertex is the minimum point
    • If a is negative then the vertex is the maximum point

Quadratic Graphs Notes Diagram 1

Quadratic Graphs Notes Diagram 2

What are the equations of a quadratic function?

  • space f left parenthesis x right parenthesis equals a x squared plus b x plus c
    • This is the general form
    • It clearly shows the y-intercept (0, c)
    • You can find the axis of symmetry by x equals negative fraction numerator b over denominator 2 a end fraction
      • This is given in the formula booklet
  • space f left parenthesis x right parenthesis equals a left parenthesis x minus p right parenthesis left parenthesis x minus q right parenthesis
    • This is the factorised form
    • It clearly shows the roots (p, 0) & (q, 0)
    • You can find the axis of symmetry by x equals fraction numerator p plus q over denominator 2 end fraction
  • space f left parenthesis x right parenthesis equals a left parenthesis x minus h right parenthesis squared plus k
    • This is the vertex form
    • It clearly shows the vertex (h, k)
    • The axis of symmetry is therefore x equals h
    • It clearly shows how the function can be transformed from the graph y equals x squared
      • Vertical stretch by scale factor ­a
      • Translation by vector stretchy left parenthesis table row h row k end table stretchy right parenthesis

How do I find an equation of a quadratic?

  • If you have the roots x = p and x = q...
    • Write in factorised form space y equals a left parenthesis x minus p right parenthesis left parenthesis x minus q right parenthesis
    • You will need a third point to find the value of a
  • If you have the vertex (h, k) then...
    • Write in vertex form y equals a left parenthesis x minus h right parenthesis squared plus k
    • You will need a second point to find the value of a
  • If you have three random points (x1, y1), (x2, y2) & (x3, y3) then...
    • Write in the general form y equals a x squared plus b x plus c
    • Substitute the three points into the equation
    • Form and solve a system of three linear equations to find the values of a, b & c

Exam Tip

  • Use your GDC to find the roots and the turning point of a quadratic function
    • You do not need to factorise or complete the square
    • It is good exam technique to sketch the graph from your GDC as part of your working

Worked example

The diagram below shows the graph of space y equals f left parenthesis x right parenthesis, where space f left parenthesis x right parenthesis is a quadratic function.

The intercept with the y-axis and the vertex have been labelled.

2-2-1-ib-aa-sl-we-image

Write down an expression for space y equals f left parenthesis x right parenthesis.

2-2-1-ib-aa-sl-quad-function-we-solution

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Dan

Author: Dan

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.