For us to be able to apply the integral comparison test to a function $f(x)$, this function has to have how many of the following properties?a) $f(x)$ has to be non-negativeb) $f(x)$ has to be decreasing c) $f(x)$ has to integrabled) $\lim_{x\to \infty} f(x)=0$e) $f(x)$ has to be increasingf) $f(x)$ has to be differentiable

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To assess when the integral comparison test can be applied to a function f(x), we need to examine the typical hypotheses behind the test. 
Option a) non-negative: The standard version of the integral test requires f(x) to be non-negative on the interval considered, because the comparison is made between the tail of the improper integral and a series with nonnegative terms. If f takes negative values, the comparison with a positive series is not meaningful, so this property is essential. 
Option b) decreasing: A monotone decreasing behavior ensures that the tail of the integral can be bounded in a way that mirrors the behavior of the corresponding series terms. If f were not decreasing, the neat upper or lower bounds used in the comparison may fail, making the test inapplicable or unreliable. 
Option c) integrable: For the integral comparison test to even be meaningful, we typically consider the improper integral ∫ f(x) dx over [a, ∞) or a similar interval. This requires f to be integrable in the improper sense (the integral exists as a limit, whether convergent or divergent). Without integrability in the improper sense, the comparison to a series loses its footing. 
Option d) lim_{x→∞} f(x) = 0: While a limit of zero is a common heuristic and is necessary for convergence of many integrals, it is not a strict requirement for the setup of the integral test itself. A function could fail to have limit zero yet still be subject to comparison in certain contexts, or the divergence could be established differently; therefore this condition is not a core requirement of the test. 
Option e) increasing: Requiring f to be increasing would contradict the common setup of the integral test, which relies on replacing the tail of an infinite integral with a decreasing sequence to compare it to a p-series or similar. Thus, this property is inconsistent with the usual requirements and would obstruct the intended comparison. 
Option f) differentiable: Differentiability is not a general prerequisite for the integral test. Many functions used in examples are continuous and even piecewise-defined, but differentiability is not part of the standard hypothesis set. The test can still be applied without assuming f is differentiable. 
In summary, the core conditions that align with the standard integral test framework are: non-negativity, monotone decrease, and integrability in the improper sense. Other properties listed here (limit to zero, increasing nature, differentiability) are not required and, in some cases, are opposed by the test’s typical assumptions.

MTH1030 -1035 - S1 2025 MTH1030/5 Week 8 lesson quiz: Infinite sequences and series

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