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Exam-style 2 - I1 Locate roots of f(x) = 0 by considering changes of sign of f(x) in an interval of x on which f(x) is sufficiently well behaved; understand how change of sign methods can fail. - Pure Mathematics

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At a glance

Question

Type

exam_style

Style

Topic

Pure Mathematics

Exam-style question

Try this first

I1: A student gives an answer to a numerical methods problem without explaining the method. Describe what working should be shown for locate roots of f(x) = 0 by considering changes of sign of… and explain one common error to avoid.

Model answer

What a good answer should say

  • The working should make the mathematical structure visible before any final answer is stated.
  • For locate roots of f(x) = 0 by considering changes of sign of…, the student should write the chosen rule or definition, apply it step by step, and explain why each transformation is valid.
  • A common error is that a procedure is only valid when its assumptions match the mathematical object.
  • The final line should connect the result back to the original problem, including any exact form, interval, units, modelling assumption or restriction required by the objective.

This answer is tied to the objective: I1 Locate roots of f(x) = 0 by considering changes of sign of f(x) in an interval of x on which f(x) is sufficiently well behaved; understand how change of sign methods can fail..

Explanation

Why this works

Use the explanation to connect the worked answer back to I1 Locate roots of f(x) = 0 by considering changes of sign of f(x) in an interval of x on which f(x) is sufficiently well behaved; understand how change of sign methods can fail..

This question is anchored to I1 because it tests method selection and reasoning for locate roots of f(x) = 0 by considering changes of sign of…, not a disconnected routine skill. It rewards precise notation, visible working and a final conclusion that follows from the stated pure mathematics method.

Maths method check

  • Topic focus: Pure Mathematics.
  • Question style: exam_style.
  • Reasoning demand: recall.
  • Check the operation, notation, units, and final answer form against the question before moving on.

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