Ask a New Question
Search
Let f : [a,b] → R be a Riemann integrable function. Let α > 0 and β ∈ R. Then define g(x) := f(αx+β) on the interval I = [1/α(a−β), 1/α(b−β)]. Show that g is Riemann integrable on I
Ask a New Question
or
answer this question
.
Similar Questions
f(x) = {
2 if x ! [0, 1) −1 if x = 1 3 if x ! (1, 2] −5 if x ! (2, 3) 20 if x = 3 } Prove that the function is Riemann
1 answer
Construct an example of two Riemann integrable functions whose composition is not Riemann integrable.
1 answer
Find two non-Riemann integrable functions whose sum is not Riemann integrable.
3 answers
Prove that the function defined by:
f(x)={1 if x is rational, 0 if x is irrational is not integrable on [0,1]. Show that no
1 answer
more similar questions