Let the function f: R-->R be given with f(t) = tan^-1 (t) Use taylors formula with the reminder to give an estimate to pi/4 = tan^-1(1) (without using the pi button on the calculator) Show that the reminder E1(1) lies between -1 and 0 and that pi/4 is equal to P1(1) - 1/4 = 3/4 with an error less then 1/4 t²f" (5)remainder E1( twhere 0 < § < t2!-2tf"(1+r²)²r (e) -()-25=(1+5')-25 1?t = t+= t +2!(1+5')?(1+5°)? = tan- (t), f(0) = tan-1(0) = 0first we find the derivative of f(t)f(t)f(0) = T401+121+0taylor polynomial P1(t) = f(0) + t f'(0) = 0 + t x 1 = t

To provide an estimate for π4 using the remainder and also to prove that -1≤E1(1)≤0. It is given…

Answered: Let the function f: R-->R be given with…

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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Let the function f: R-->R be given with f(t) = tan^-1 (t)

Use taylors formula with the reminder to give an estimate to pi/4 = tan^-1(1) (without using the pi button on the calculator) Show that the reminder E₁(1) lies between -1 and 0 and that pi/4 is equal to P₁(1) - 1/4 = 3/4 with an error less then 1/4

t²f" (5)
remainder E1( t
where 0 < § < t
2!
-2t
f"
(1+r²)²
r (e) -
()
-25
=
(1+5')
-25 1?
t = t+
= t +
2!
(1+5')?
(1+5°)?

= tan- (t), f(0) = tan-1(0) = 0
first we find the derivative of f(t)
f(t)
f(0) = T40
1+12
1+0
taylor polynomial P1(t) = f(0) + t f'(0) = 0 + t x 1 = t

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