3.22 If f € R[a, b), prove |f| € R[a, b]. (Hint: Use Exercises 3.20 and 3.21above.)For reference3.20 † Let f be any real-valued function on a domain DCR. Definef+(æ) = f(x) if f(x) > 0,if f(r) <0.f*(x) =and let-f(z)-f(r)if f(x) < 0,if f(x) 20f (2) =for all r E D. Prove thatf(x) = f*(x) – ƒ¯ (x) and |f(x)| = f+(x) + f¯(x)for all r e D. (Hint: Just check the cases based on the sign of f(r).)3.21 1 Suppose f E R[a, b]. Prove: f+ and f- are in R[a, b). Hint: Show thatU+, P) - L(f+, Р)

Given that, f∈Ra,b which mean f is Riemann integrable on the interval a,b To prove that, f∈Ra,b…

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3.22 If f e R[a, b], prove |f| € R[a, b]. (Hint: Use Exercises 3.20 and 3.21 above.)

College Algebra (MindTap Course List)

12th Edition

ISBN:9781305652231

Author:R. David Gustafson, Jeff Hughes

Publisher:R. David Gustafson, Jeff Hughes

Chapter3: Functions

Section3.3: More On Functions; Piecewise-defined Functions

Problem 99E: Determine if the statemment is true or false. If the statement is false, then correct it and make it...

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Question

3.22 If f € R[a, b), prove |f| € R[a, b]. (Hint: Use Exercises 3.20 and 3.21
above.)
For reference
3.20 † Let f be any real-valued function on a domain DCR. Define
f+(æ) = f(x) if f(x) > 0,
if f(r) <0.
f*(x) =
and let
-f(z)
-f(r)
if f(x) < 0,
if f(x) 20
f (2) =
for all r E D. Prove that
f(x) = f*(x) – ƒ¯ (x) and |f(x)| = f+(x) + f¯(x)
for all r e D. (Hint: Just check the cases based on the sign of f(r).)
3.21 1 Suppose f E R[a, b]. Prove: f+ and f- are in R[a, b). Hint: Show that
U+, P) - L(f+, Р) <U(, P) — L(f, P).

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