Answer the following multiple choice question accordingly: Claim: all integers n greater than or equal to four can be written as a sum of two or more prime numbers (possibly repeated) Proof: By strong induction. Base case: for n=4, the sum 2+2 works For the inductive step, assume its true for all k

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Answer the following question accordingly:
Answer the following multiple choice question accordingly:
Claim: all integers n greater than or equal to four can be
written as a sum of two or more prime numbers (possibly
repeated)
Proof: By strong induction. Base case: for n=4, the sum 2+2
works
For the inductive step, assume its true for all k<n, and we’ll
show it holds for n. Consider k=n-2. By the inductive
hypothesis, this must equal a sum of primes p1+p2+...+pm.
Then we can add 2 to this to get a sum of primes that equals
n.
Is this proof correct? (JUST ANSWER YES OR NO)
Transcribed Image Text:Answer the following multiple choice question accordingly: Claim: all integers n greater than or equal to four can be written as a sum of two or more prime numbers (possibly repeated) Proof: By strong induction. Base case: for n=4, the sum 2+2 works For the inductive step, assume its true for all k<n, and we’ll show it holds for n. Consider k=n-2. By the inductive hypothesis, this must equal a sum of primes p1+p2+...+pm. Then we can add 2 to this to get a sum of primes that equals n. Is this proof correct? (JUST ANSWER YES OR NO)
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