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Exercises; prove that 1) tan z = 2 +²²³ +²²³ + ...

Exercises; prove that 1) tan z = 2 +²²³ +²²³ + ...

Advanced Engineering Mathematics
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Exercises; prove that (1) tan z = 2 + ²²³ +²²² + ... 2) tan ¹2 = 8-2³² +²²- + +₁₁₁ = ਨੂੰ 3) Sinhz = 2 + ²3/11 0 Σ n=1 2n-1 Z (2n) 4) Gosh p= 1+ 2+ + 2 C 5) + = 2²6-0² (2-1)", uke 12-11 <1- n=0 (2n-1) 9 9 47² = 2 (-1)" 2²" ₂ When 1²K1.
Transcribed Image Text:Exercises; prove that (1) tan z = 2 + ²²³ +²²² + ... 2) tan ¹2 = 8-2³² +²²- + +₁₁₁ = ਨੂੰ 3) Sinhz = 2 + ²3/11 0 Σ n=1 2n-1 Z (2n) 4) Gosh p= 1+ 2+ + 2 C 5) + = 2²6-0² (2-1)", uke 12-11 <1- n=0 (2n-1) 9 9 47² = 2 (-1)" 2²" ₂ When 1²K1.
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