Discrete Math Proof: Divisibility equivalence. For all integers a, b, d, if d divides a, and d divides b, then d divides (3a+2b) and d divides (2a+b). Prove the statement.

Slovenujozk

Slovenujozk

Answered question

2022-09-05

Discrete Math Proof: Divisibility equivalence
For all integers a, b, d, if d divides a, and d divides b, then d divides ( 3 a + 2 b ) and d divides ( 2 a + b ). Prove the statement.
What Assumptions do I need to make at the beginning of this proof that include ( 3 a + 2 b ) and ( 2 a + b ). I can start off the proof with:
Suppose a, b, d are integers and that d divides a, and d divides b. Then by definition of divisibility, there exist integers c, k, such that a = d c and b = d k.

Answer & Explanation

Teagan Sutton

Teagan Sutton

Beginner2022-09-06Added 12 answers

Explanation:
Just write out what 3 a + 2 b and 2 a + b equal after making the substitutions a = d c and b = d k.

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