Consider the sum (3)² + (8)² + (13)² + · · + (15n – 2)² .1[m(m + 1)] and— m(т + 1)(2т + 1)] to prove thatUse identitiesk=1(3)² + (8)² + (13)² + ..+ (15n – 2)² = (n) (450n2 + 45n – 11).

Consider S=32+82+132+ . . . .+15n-22

Consider the sum (3)² + (8)² + (13)2 + · . + (15n – 2)2. | m 1 1 m(т + 1)] and k2 = (m(m + 1)(2m + 1)] to prove that k=1 Use identities k (3)² + (8)² + (13)² +· …+(15n – 2)² =;(n) (450n² + 45n – 11). 150n² - ...

Consider the sum (3)² + (8)² + (13)2 + · . + (15n – 2)2. | m 1 1 m(т + 1)] and k2 = (m(m + 1)(2m + 1)] to prove that k=1 Use identities k (3)² + (8)² + (13)² +· …+(15n – 2)² =;(n) (450n² + 45n – 11). 150n² - ...

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter7: Real And Complex Numbers

Section7.3: De Moivre’s Theorem And Roots Of Complex Numbers

Problem 20E

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Question

Consider the sum (3)² + (8)² + (13)² + · · + (15n – 2)² .
1
[m(m + 1)] and
— m(т + 1)(2т + 1)] to prove that
Use identities
k=1
(3)² + (8)² + (13)² + ..+ (15n – 2)² = (n) (450n2 + 45n – 11).

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