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Use properties of integrals together with exercises 27 and 28 to prove the inequality.

A) Prove it directly
B) Use mathematical induction
C) Prove by contradiction
D) None of the above

User Roay Spol
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Final answer:

To prove the inequality using properties of integrals, you can use approaches such as direct proof, mathematical induction, or proof by contradiction.

Step-by-step explanation:

To prove the inequality using properties of integrals, we need to use exercises 27 and 28 as reference. The specific steps and methods to prove the inequality depend on the details of the question being asked, which have not been provided. However, some possible approaches could be:

  1. Direct Proof: Start with the given inequality and manipulate it using properties of integrals to show that it holds true.
  2. Mathematical Induction: Use mathematical induction to prove that the inequality holds for a base case, and then show that if it holds for any arbitrary case, it also holds for the next case.
  3. Proof by Contradiction: Assume that the inequality is false and show that it leads to a contradiction, thus proving that the inequality is true.

Without the specific details of the inequality and the exercises, it is not possible to provide a step-by-step explanation. However, these approaches should give you a starting point to prove the inequality based on the given exercises.

User Samssonart
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