1. Create a flow proof of the following result: For every real number x, if (x − 3)² ≤ 0, then 10- x² > 0. - 2. For each of the following parts, consider the result: For every integer n, n is even if and only if 3n - 11 is odd. (a) Notice the result is a biconditional statement. Write out the two implications you need to show in order to prove the result. (b) Create two separate flow proofs, one for each of the implications you listed in part (a). (Hint: Use the technique proof of contrapositive for one of the implications.)

1. Create a flow proof of the following result: For every real number x, if (x − 3)² ≤ 0, then 10- x² > 0. - 2. For each of the following parts, consider the result: For every integer n, n is even if and only if 3n - 11 is odd. (a) Notice the result is a biconditional statement. Write out the two implications you need to show in order to prove the result. (b) Create two separate flow proofs, one for each of the implications you listed in part (a). (Hint: Use the technique proof of contrapositive for one of the implications.)

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter2: Equations And Inequalities

Section2.6: Inequalities

Problem 80E

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Question

Recall in a flow proof, each step should be a single statement (in a box or on a line), and each arrow should
be labeled with the appropriate justification (definition or property).
1. Create a flow proof of the following result:
For every real number x, if (x - 3)² ≤ 0, then 10 - x² > 0.
2. For each of the following parts, consider the result:
For every integer n, n is even if and only if 3n - 11 is odd.
(a) Notice the result is a biconditional statement. Write out the two implications you need to show in
order to prove the result.
(b) Create two separate flow proofs, one for each of the implications you listed in part (a).
(Hint: Use the technique proof of contrapositive for one of the implications.)

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