For any a ony 1 RIGHT (₂ m)-f(x)d₂] ≤ / (bud) ² max [1/(20) d > ohy f: [dsb] → IR and ony n ≥ 1 (iv) | SIMP (fin) - ] f(xidz | ≤ (6-0)5 max 1(80) (x)) 1 180n4 XElaby where RIGHT(fin) is the right hand Riemann sun with n equal intervale and SIMP (fin) is approximation of Ĵ f(x) Using Simpson's rule n equal intervals with aj. Suppose that b). show that some f is a 3rd degree polynomial, f(x) = α3x²³ +d² dix+do. Argue that for any nod and be SIMP (fin) = f(x) dx is not true for d Right (fen); RIGHT (En) + " [f(oxida
For any a ony 1 RIGHT (₂ m)-f(x)d₂] ≤ / (bud) ² max [1/(20) d > ohy f: [dsb] → IR and ony n ≥ 1 (iv) | SIMP (fin) - ] f(xidz | ≤ (6-0)5 max 1(80) (x)) 1 180n4 XElaby where RIGHT(fin) is the right hand Riemann sun with n equal intervale and SIMP (fin) is approximation of Ĵ f(x) Using Simpson's rule n equal intervals with aj. Suppose that b). show that some f is a 3rd degree polynomial, f(x) = α3x²³ +d² dix+do. Argue that for any nod and be SIMP (fin) = f(x) dx is not true for d Right (fen); RIGHT (En) + " [f(oxida
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section5.3: The Natural Exponential Function
Problem 56E
Related questions
Question
![For any
d
a <b, ony f: [dsb] → IR and ony n>1
RIGHT (f.
bo
| SIMP (fin) - f(x)dz | ≤ (6-4)³5 max 1(V) (2))
18014 KE[a b]!
where RIGHT(fin) is the right hand Riemann sum with n
equal intervale and SIMP(fon) is aflatoximation of f(x)
Using Simpson's rule with n equal intervals
$
a). Suppose that
n)-f(x)dz) ≤ (b-d) ² max [f'(x)
1/1/201
1
nxE[db]
d
b). show that some
f is a 3rd degree polynomial f(x) = d3x²³ + d²
2
dix+do.
Argue that for any n,d and be
SIMP (fin) = f(x) dx
is not true for d Right (fon); RIGHT (fin) + "[ florida
d](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F9b0d42b5-3479-420b-a2e4-bea672ad5500%2F0526e6ab-d40c-42ce-80b2-7efc5ebd44e9%2F24aomy9_processed.jpeg&w=3840&q=75)
Transcribed Image Text:For any
d
a <b, ony f: [dsb] → IR and ony n>1
RIGHT (f.
bo
| SIMP (fin) - f(x)dz | ≤ (6-4)³5 max 1(V) (2))
18014 KE[a b]!
where RIGHT(fin) is the right hand Riemann sum with n
equal intervale and SIMP(fon) is aflatoximation of f(x)
Using Simpson's rule with n equal intervals
$
a). Suppose that
n)-f(x)dz) ≤ (b-d) ² max [f'(x)
1/1/201
1
nxE[db]
d
b). show that some
f is a 3rd degree polynomial f(x) = d3x²³ + d²
2
dix+do.
Argue that for any n,d and be
SIMP (fin) = f(x) dx
is not true for d Right (fon); RIGHT (fin) + "[ florida
d
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