Induction Divisibility | Summary and Q&A

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November 22, 2018
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The Organic Chemistry Tutor
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Induction Divisibility

TL;DR

Learn how to use mathematical induction to prove divisibility, with examples of proving divisibility by 5 and 4.

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Key Insights

  • 👍 Proof by mathematical induction involves proving a statement for the first term and then proving it for the next terms.
  • 😑 Divisibility can be shown by substituting values and simplifying the expression.
  • 😑 Induction can be used to prove divisibility for various numbers and expressions.
  • 👍 Divisibility can be proven for specific conditions, such as positive even integers.

Transcript

in this video we're gonna focus on induction divisibility problems like this one prove that six raised to the 4n plus four is divisible by five for all positive integers n so how can we do that well there are some basic steps that you need to be familiar with so step one is that we need to prove that the statement is true when n is equal to one so ... Read More

Questions & Answers

Q: What are the steps involved in proving divisibility using mathematical induction?

The steps include proving the statement for the first term, assuming it is true for a specific term, and then proving it for the next term by replacing variables and simplifying the expression.

Q: How is the statement proved for the first term in the examples given?

In the first example, it is shown that 6^(4n+4) is divisible by 5 when n=1 by substituting n=1 into the expression. Similarly, in the second example, it is shown that 7^(n-2)^n is divisible by 5 when n=1 by substituting n=1 into the expression. In the third example, it is shown that n*(n+2) is divisible by 4 when n=2 by substituting n=2 into the expression.

Q: How is the assumption made in the examples given?

In the first example, the assumption is made by replacing n with a variable K in the expression 6^(4n+4). Similarly, in the second example, the assumption is made by replacing n with a variable K in the expression 7^(n-2)^n. In the third example, the assumption is made by replacing n with a variable K in the expression n*(n+2).

Q: How is the divisibility proved for the next term in the examples?

In each example, the next term is represented by replacing n with K+1 in the expression. The expression is then simplified, and it is shown that it is divisible by the necessary number (5 or 4) by factoring out common terms.

Summary & Key Takeaways

  • The video explains the steps to prove divisibility using mathematical induction, which involves proving a statement for the first term, assuming it is true for a given term, and then proving it for the next term.

  • Three examples of proving divisibility are provided: proving that 6^(4n+4) is divisible by 5, proving that 7^(n-2)^n is divisible by 5, and proving that n*(n+2) is divisible by 4 for all positive even integers n.

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