a) Use notation to write the following sum in a compact form: ... - n+2(n-1)+3(n − 2) + + (n − 2)3 + (n − 1)2 + n - - b) Use mathematical induction to show that for any nЄ N, - - • n+2(n − 1) + 3(n − 2) + ··· + (n − 2)3 + (n − 1)2 + n = - - n(n + 1)(n+2) 6 (Hint: When you want to go from the hypothesis p(n) to the conclusion p(n+1), show that you just need to prove that LHS(n + 1) − LHS(n) = RHS(n + 1) − RHS(n), and use this trick to simplify your calculations) -
a) Use notation to write the following sum in a compact form: ... - n+2(n-1)+3(n − 2) + + (n − 2)3 + (n − 1)2 + n - - b) Use mathematical induction to show that for any nЄ N, - - • n+2(n − 1) + 3(n − 2) + ··· + (n − 2)3 + (n − 1)2 + n = - - n(n + 1)(n+2) 6 (Hint: When you want to go from the hypothesis p(n) to the conclusion p(n+1), show that you just need to prove that LHS(n + 1) − LHS(n) = RHS(n + 1) − RHS(n), and use this trick to simplify your calculations) -
Algebra and Trigonometry (6th Edition)
6th Edition
ISBN:9780134463216
Author:Robert F. Blitzer
Publisher:Robert F. Blitzer
ChapterP: Prerequisites: Fundamental Concepts Of Algebra
Section: Chapter Questions
Problem 1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,...
Related questions
Question
Transcribed Image Text:a)
Use notation to write the following sum in a compact form:
...
-
n+2(n-1)+3(n − 2) + + (n − 2)3 + (n − 1)2 + n
-
-
b)
Use mathematical induction to show that for any nЄ N,
-
-
•
n+2(n − 1) + 3(n − 2) + ··· + (n − 2)3 + (n − 1)2 + n =
-
-
n(n + 1)(n+2)
6
(Hint: When you want to go from the hypothesis p(n) to the conclusion p(n+1), show that you just need to prove that
LHS(n + 1) − LHS(n) = RHS(n + 1) − RHS(n), and use this trick to simplify your calculations)
-
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