A function is said to be Hoelder a continuous on [a, b] iff |f(x) – f(x')| < C|x – a'|ª for some G, α>0. Show that if a > 1 then f is constant in [a, b).
A function is said to be Hoelder a continuous on [a, b] iff |f(x) – f(x')| < C|x – a'|ª for some G, α>0. Show that if a > 1 then f is constant in [a, b).
Chapter3: Functions
Section3.3: Rates Of Change And Behavior Of Graphs
Problem 2SE: If a functionfis increasing on (a,b) and decreasing on (b,c) , then what can be said about the local...
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![A function is said to be Hoelder a continuous on [a, b] iff
|f(x) – f(x')| < C|x – a'|ª
for some G, α>0.
Show that if a > 1 then f is constant in [a, b).](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Ff2ab050a-d13e-4a73-9fee-dc44d5d071e8%2Fb80e353e-82ae-40ee-b0d6-ca28d1716b88%2Fbbcvo1g_processed.png&w=3840&q=75)
Transcribed Image Text:A function is said to be Hoelder a continuous on [a, b] iff
|f(x) – f(x')| < C|x – a'|ª
for some G, α>0.
Show that if a > 1 then f is constant in [a, b).
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