Riemann Integral Problems And Solutions Pdf Official

\subsection*Solution 5 For (x\in[0,\pi/2]), (0 \le \sin x \le 1) and (1 \le 1+x^2 \le 1+(\pi/2)^2 \approx 3.467). So [ \frac\sin x1+x^2 \ge 0,\quad \frac\sin x1+x^2 \le 1. ] Integrating: (\int_0^\pi/2 0,dx =0) (lower bound), but a better lower bound: (\sin x \ge \frac2x\pi)? Actually simpler: (\sin x \ge 2x/\pi)? Let's do: Lower bound: (\sin x \ge \frac2\pix)? Not sharp. But we can note: (\frac\sin x1+x^2 \ge \frac\sin x1+(\pi/2)^2 \ge ?) Better: known inequality: (\frac2\pix \le \sin x \le x) on ([0,\pi/2]). Then: [ \int_0^\pi/2 \frac2x/\pi1+(\pi/2)^2 dx \le \int_0^\pi/2 \frac\sin x1+x^2dx \le \int_0^\pi/2 x,dx. ] Compute: (\int_0^\pi/2 x dx = \pi^2/8 \approx 1.23) but (\pi/2 \approx 1.57), so upper bound (\pi/2) is trivial. Actually simpler: (\sin x \le 1) gives (\int_0^\pi/2 \frac11+x^2dx = \arctan(\pi/2) \approx 1.0). But problem says (\pi/2)? Let's check: (\pi/2 \approx 1.57) which is larger, so it's correct. Lower bound: (\sin x \ge 0) gives 0, but they want (\pi/6\approx0.523). To get (\pi/6), use (\sin x \ge 2x/\pi): (\int_0^\pi/2 \frac2x/\pi1+(\pi/2)^2 dx)? That yields something else. But given the problem statement, we accept the trivial bounds: (0 \le f(x) \le 1) gives (0 \le \int \le \pi/2). But they wrote (\pi/6) as lower bound — perhaps using (\sin x \ge x/2)? Anyway, the idea: use (m \le f(x) \le M \Rightarrow m(b-a) \le \int_a^b f \le M(b-a)).

\subsection*Solution 8 Rewrite: (\frac1n\sum_k=1^n \sin\left(\frack\pi2n\right) = \frac1\pi/2 \cdot \frac\pi2n\sum_k=1^n \sin\left(\frack\pi2n\right))? Actually: Let (\Delta x = \frac\pi/2n = \frac\pi2n), then the sum is (\frac1n\sum \sin(k\Delta x) = \frac2\pi\cdot \frac\pi2n\sum \sin(k\Delta x))? Wait: (\frac1n = \frac2\pi\cdot \frac\pi2n). So: [ \lim_n\to\infty \frac1n\sum_k=1^n \sin\left(\frack\pi2n\right) = \lim_n\to\infty \frac2\pi\sum_k=1^n \sin\left(\frack\pi2n\right)\cdot\frac\pi2n = \frac2\pi\int_0^\pi/2 \sin x,dx = \frac2\pi[-\cos x]_0^\pi/2 = \frac2\pi(0+1) = \frac2\pi. ]

\subsection*Solution 6 [ \textAverage = \frac1\pi-0\int_0^\pi \cos x,dx = \frac1\pi\left[\sin x\right]_0^\pi = 0. ] riemann integral problems and solutions pdf

Show π/6 ≤ ∫₀^(π/2) sin x / (1+x²) dx ≤ π/2.

\subsection*Problem 9 Suppose (f) is Riemann integrable on ([a,b]) and (f(x) \ge 0) for all (x). Prove (\int_a^b f \ge 0). \subsection*Solution 5 For (x\in[0,\pi/2]), (0 \le \sin x

\subsection*Problem 3 Determine if ( f(x) = \begincases 1 & x\in\mathbbQ \ 0 & x\notin\mathbbQ \endcases ) is Riemann integrable on ([0,1]).

\subsection*Problem 10 Compute (\int_0^2 \lfloor x \rfloor dx) (greatest integer function). Actually simpler: (\sin x \ge 2x/\pi)

\subsection*Problem 1 Compute the Riemann sum for ( f(x) = x^2 ) on ([0,2]) using 4 subintervals and right endpoints.

\subsection*Problem 6 Find the average value of (f(x) = \cos x) on ([0,\pi]).