Definite Integration (Edexcel International A Level Maths: Pure 2)

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Definite Integration

What is definite integration?

  • Definite Integration occurs in an alternative version of the Fundamental Theorem of Calculus
  • This version of the Theorem is the one referred to by most AS/A level textbooks/websites

-Notes-fig1, AS & A Level Maths revision notes

  • a and b are called limits
    • a is the lower limit
    • b is the upper limit
  • f’(x) is the derivative of f(x)

What happened to c, the constant of integration?

Notes fig2, AS & A Level Maths revision notes

  •  “+c” would appear in both f(a) and f(b)
    • Since we then calculate f(b)f(a) they cancel each other out
    • There would be a “+c” from f(b) and a +c” from f(a)
  • So “+c” is not included with definite integration

How do I find a definite integral?

  • STEP 1: If not given a name, call the integral
    • This saves you having to rewrite the whole integral every time!
  • STEP 2:  If necessary rewrite the integral into a more easily integrable form
    • Not all functions can be integrated directly
  • STEP 3:  Integrate without applying the limits
    • Notation: use square brackets [ ] with limits placed after the end bracket
  • STEP 4:  Substitute the limits into the function and calculate the answer

Notes fig3, A Level & AS Level Pure Maths Revision Notes

Using a calculator

  • Advanced scientific calculators can work out the values of definite integrals
  • The button will look similar to:

Notes fig4, AS & A Level Maths revision notes

Notes fig5, AS & A Level Maths revision notes

  •  (Note how the calculator did not return the exact value open parentheses 1256 over 3 close parentheses of the integral)

Examiner Tip

  • Look out for questions that ask you to find an indefinite integral in one part (so “+c” needed), then in a later part use the same integral as a definite integral (where “+c” is not needed).

Worked example

Example fig1, A Level & AS Level Pure Maths Revision Notes

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Paul

Author: Paul

Expertise: Maths

Paul has taught mathematics for 20 years and has been an examiner for Edexcel for over a decade. GCSE, A level, pure, mechanics, statistics, discrete – if it’s in a Maths exam, Paul will know about it. Paul is a passionate fan of clear and colourful notes with fascinating diagrams – one of the many reasons he is excited to be a member of the SME team.