Q. Assume that f(x) is Riemann integrable and g(x) is Lebesgue integrable over [a, b], then one of the following is true a. g(x) – f(x) is Riemann integrable over [a, b]. b. f(x).g(x) is not Lebesgue integrable over [a, b]. c. f(x) +g(x) is Riemann integrable over [a, b]. d.3f(x) + 29(x) is Lebesgue integrable over [a, b]. e. None of these.

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Chapter2: Second-order Linear Odes
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Q. Assume that f(x) is Riemann integrable and g(x) is Lebesgue
integrable over [a, b], then one of the following is true
a. g(x) – f(x) is Riemann integrable over [a, b].
b. f(x).g(x) is not Lebesgue integrable over [a, b].
c. f(x) + g(x) is Riemann integrable over [a, b].
d.3f(x) + 29(x) is Lebesgue integrable over [a, b].
e. None of these.
Transcribed Image Text:Q. Assume that f(x) is Riemann integrable and g(x) is Lebesgue integrable over [a, b], then one of the following is true a. g(x) – f(x) is Riemann integrable over [a, b]. b. f(x).g(x) is not Lebesgue integrable over [a, b]. c. f(x) + g(x) is Riemann integrable over [a, b]. d.3f(x) + 29(x) is Lebesgue integrable over [a, b]. e. None of these.
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