Find f(1), f(2), ƒ (3), ƒ (4), and f (5) if f (n) is defined recursively by f (0) = 3 and for n = 0, 1, 2, ... a) f(n + 1) = -2f (n). b) f(n + 1) = 3f (n) +7. c) f(n +1) = f(n)2-2f (n) – 2. d) f(n + 1) = 35 (m)/3_

Find f(1), f(2), ƒ (3), ƒ (4), and f (5) if f (n) is defined recursively by f (0) = 3 and for n = 0, 1, 2, ... a) f(n + 1) = -2f (n). b) f(n + 1) = 3f (n) +7. c) f(n +1) = f(n)2-2f (n) – 2. d) f(n + 1) = 35 (m)/3_

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section4.3: Zeros Of Polynomials

Problem 32E

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Question

Find f (1), f(2). f (3), ƒ (4), and f(5) if f (n) is defined
recursively by f (0) = 3 and for n = 0, 1, 2, ...
a) f(n + 1) = -2f (n).
b) f(n +1) = 3f (n) + 7.
c) f(n + 1) = f (n)2-2f (n) – 2.
d) f(n + 1) = 3/(m)/3.

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