Calculus II — Mastery Exam

Integration Techniques

Key Concepts & Formulas

\(\displaystyle\int u\,dv = uv - \int v\,du\) — Integration by Parts (IBP)

\(\displaystyle\int \frac{f'(x)}{f(x)}\,dx = \ln|f(x)| + C\)

Trig Identities: \(\sin^2 x = \frac{1-\cos 2x}{2}\), \(\cos^2 x = \frac{1+\cos 2x}{2}\)

Trig Sub: \(\sqrt{a^2-x^2}\Rightarrow x=a\sin\theta\); \(\sqrt{x^2+a^2}\Rightarrow x=a\tan\theta\)

Worked Example

\(\displaystyle\int x e^x dx\): Let \(u=x,\;dv=e^x dx\). Then \(du=dx,\;v=e^x\). Result: \(xe^x - e^x + C\).

Integration by Parts Medium

Evaluate \(\displaystyle\int x\cos x\,dx\).

\(x\sin x - \cos x + C\)

\(x\sin x + \cos x + C\)

\(-x\sin x + \cos x + C\)

\(\cos x - x\sin x + C\)

✓ Solution

IBP: \(u=x,\;dv=\cos x\,dx \Rightarrow du=dx,\;v=\sin x\).
\(\int x\cos x\,dx = x\sin x - \int\sin x\,dx = x\sin x + \cos x + C\).

Trig Integrals Medium

Evaluate \(\displaystyle\int \sin^2 x\,dx\).

\(\dfrac{x}{2} + \dfrac{\sin 2x}{4} + C\)

\(\dfrac{x}{2} - \dfrac{\sin 2x}{4} + C\)

\(-\dfrac{\sin 2x}{4} + C\)

\(\dfrac{x}{2} - \dfrac{\cos 2x}{4} + C\)

✓ Solution

Use \(\sin^2 x = \dfrac{1-\cos 2x}{2}\).
\(\int\sin^2 x\,dx = \int\dfrac{1-\cos 2x}{2}\,dx = \dfrac{x}{2} - \dfrac{\sin 2x}{4} + C\).

Trigonometric Substitution Hard

Evaluate \(\displaystyle\int \frac{dx}{\sqrt{4-x^2}}\).

\(\arcsin\!\left(\dfrac{x}{2}\right) + C\)

\(\dfrac{1}{2}\arcsin\!\left(\dfrac{x}{2}\right) + C\)

\(\arctan\!\left(\dfrac{x}{2}\right) + C\)

\(2\arcsin x + C\)

✓ Solution

Standard formula: \(\displaystyle\int\frac{dx}{\sqrt{a^2-x^2}}=\arcsin\!\left(\frac{x}{a}\right)+C\) with \(a=2\).
Answer: \(\arcsin\!\left(\dfrac{x}{2}\right)+C\).

Partial Fractions & Improper Integrals

Key Concepts

Partial Fractions: \(\dfrac{P(x)}{(x-a)(x-b)} = \dfrac{A}{x-a}+\dfrac{B}{x-b}\)

Improper Integral: \(\displaystyle\int_1^\infty \frac{dx}{x^p}\) converges iff \(p>1\)

\(\displaystyle\int_a^\infty f(x)\,dx = \lim_{t\to\infty}\int_a^t f(x)\,dx\)

Quick Tip

For \(\frac{1}{x^2-1}=\frac{1}{(x-1)(x+1)}\), cover-up: \(A=\frac{1}{1+1}=\frac12\), \(B=\frac{1}{-1-1}=-\frac12\).

Partial Fractions Hard

Evaluate \(\displaystyle\int \frac{2x+1}{x^2-x-2}\,dx\).

\(\ln|x-2| + \ln|x+1| + C\)

\(\ln|x^2-x-2| + C\)

\(\dfrac{5}{3}\ln|x-2| + \dfrac{1}{3}\ln|x+1| + C\)

\(2\ln|x-2| - \ln|x+1| + C\)

✓ Solution

Factor: \(x^2-x-2=(x-2)(x+1)\). Partial fractions: \(\dfrac{2x+1}{(x-2)(x+1)}=\dfrac{A}{x-2}+\dfrac{B}{x+1}\).
Multiply both sides by \((x-2)(x+1)\): \(2x+1=A(x+1)+B(x-2)\).
\(x=2\): \(5=3A\Rightarrow A=\frac{5}{3}\). \(x=-1\): \(-1=-3B\Rightarrow B=\frac{1}{3}\).
\(\displaystyle\int=\frac{5}{3}\ln|x-2|+\frac{1}{3}\ln|x+1|+C\).

Improper Integrals Medium

Does \(\displaystyle\int_1^\infty \frac{1}{x^2}\,dx\) converge? If so, find its value.

Diverges

Converges to \(2\)

Converges to \(1\)

Converges to \(\dfrac{1}{2}\)

✓ Solution

\(\displaystyle\int_1^\infty x^{-2}\,dx = \lim_{t\to\infty}\left[-\frac{1}{x}\right]_1^t = \lim_{t\to\infty}\!\left(-\frac{1}{t}+1\right)=1\).
The integral converges to \(1\).

Sequences & Series

Convergence Tests & Series

Geometric: \(\sum_{n=0}^\infty ar^n = \dfrac{a}{1-r}\) when \(|r|<1\)

p-Series: \(\sum\frac{1}{n^p}\) converges iff \(p>1\)

Ratio Test: \(L=\lim_{n\to\infty}\left|\dfrac{a_{n+1}}{a_n}\right|\). Converges if \(L<1\), diverges if \(L>1\)

Alternating Series Test (Leibniz): converges if \(b_n\searrow0\)

Divergence Test: if \(\lim a_n\neq 0\), series diverges

Geometric Series Medium

Find the sum of the series \(\displaystyle\sum_{n=0}^{\infty}\left(\frac{2}{3}\right)^n\).

\(2\)

\(3\)

\(\dfrac{2}{3}\)

Diverges

✓ Solution

Geometric series with \(a=1\) and \(r=\frac{2}{3}\). Since \(|r|<1\), it converges.
Sum \(=\dfrac{a}{1-r}=\dfrac{1}{1-\frac{2}{3}}=\dfrac{1}{\frac{1}{3}}=3\).

Ratio Test Hard

Determine the convergence of \(\displaystyle\sum_{n=1}^{\infty}\frac{n!}{3^n}\).

Converges by Ratio Test

Diverges by Ratio Test

Converges by p-Series

Ratio Test is inconclusive

✓ Solution

\(\dfrac{a_{n+1}}{a_n}=\dfrac{(n+1)!}{3^{n+1}}\cdot\dfrac{3^n}{n!}=\dfrac{n+1}{3}\to\infty\) as \(n\to\infty\).
Since \(L=\infty>1\), the series diverges by the Ratio Test.

Alternating Series Medium

Does \(\displaystyle\sum_{n=1}^{\infty}\frac{(-1)^n}{n}\) converge?

Diverges

Converges absolutely

Converges conditionally

Diverges by Divergence Test

✓ Solution

This is the alternating harmonic series. By the Alternating Series Test: \(b_n=\frac{1}{n}\) is decreasing and \(\lim_{n\to\infty}\frac{1}{n}=0\), so it converges.
But \(\sum\frac{1}{n}\) (harmonic series) diverges, so convergence is conditional, not absolute.

p-Series Medium

Which series converges?

\(\displaystyle\sum_{n=1}^\infty \frac{1}{n}\)

\(\displaystyle\sum_{n=1}^\infty \frac{1}{\sqrt{n}}\)

\(\displaystyle\sum_{n=1}^\infty \frac{1}{n^2}\)

\(\displaystyle\sum_{n=1}^\infty \frac{1}{n^{1/3}}\)

✓ Solution

p-series \(\sum\frac{1}{n^p}\) converges iff \(p>1\).
(A) \(p=1\): diverges (harmonic). (B) \(p=\frac{1}{2}<1\): diverges. (C) \(p=2>1\): converges. (D) \(p=\frac{1}{3}<1\): diverges.

Power Series & Taylor Series

Power & Taylor Series

Taylor: \(f(x)=\displaystyle\sum_{n=0}^\infty \frac{f^{(n)}(a)}{n!}(x-a)^n\)

\(e^x=\displaystyle\sum_{n=0}^\infty\frac{x^n}{n!}\), \(\sin x=\displaystyle\sum_{n=0}^\infty\frac{(-1)^n x^{2n+1}}{(2n+1)!}\), \(\cos x=\displaystyle\sum_{n=0}^\infty\frac{(-1)^n x^{2n}}{(2n)!}\)

Radius of Convergence: \(R=\lim_{n\to\infty}\left|\dfrac{a_n}{a_{n+1}}\right|\)

\(\dfrac{1}{1-x}=\displaystyle\sum_{n=0}^\infty x^n\) for \(|x|<1\)

Radius of Convergence Hard

Find the radius of convergence of \(\displaystyle\sum_{n=0}^{\infty}\frac{x^n}{n+1}\).

\(R=0\)

\(R=\infty\)

\(R=1\)

\(R=2\)

✓ Solution

Ratio Test: \(L=\lim_{n\to\infty}\left|\dfrac{x^{n+1}}{n+2}\cdot\dfrac{n+1}{x^n}\right|=|x|\cdot\lim_{n\to\infty}\dfrac{n+1}{n+2}=|x|\).
Converges when \(|x|<1\). Therefore \(R=1\).

Maclaurin Series Hard

Which is the Maclaurin series for \(e^{-x^2}\)?

\(\displaystyle\sum_{n=0}^\infty (-1)^n\frac{x^{2n}}{n!}\)

\(\displaystyle\sum_{n=0}^\infty \frac{x^{2n}}{n!}\)

\(\displaystyle\sum_{n=0}^\infty (-1)^n\frac{x^n}{n!}\)

\(\displaystyle\sum_{n=0}^\infty \frac{(-x^2)^n}{(2n)!}\)

✓ Solution

Start with \(e^u=\sum_{n=0}^\infty\frac{u^n}{n!}\). Substitute \(u=-x^2\):
\(e^{-x^2}=\sum_{n=0}^\infty\frac{(-x^2)^n}{n!}=\sum_{n=0}^\infty\frac{(-1)^n x^{2n}}{n!}\).

Taylor Polynomial Advanced

Find the third-degree Taylor polynomial for \(f(x)=\ln(1+x)\) centered at \(a=0\).

\(x - \dfrac{x^2}{2} + \dfrac{x^3}{3}\)

\(x + \dfrac{x^2}{2} + \dfrac{x^3}{3}\)

\(1 + x - \dfrac{x^2}{2}\)

\(x - x^2 + x^3\)

✓ Solution

\(f(0)=0\). \(f'(x)=\frac{1}{1+x}\Rightarrow f'(0)=1\). \(f''(x)=-\frac{1}{(1+x)^2}\Rightarrow f''(0)=-1\). \(f'''(x)=\frac{2}{(1+x)^3}\Rightarrow f'''(0)=2\).
\(T_3(x)=0+1\cdot x+\frac{-1}{2!}x^2+\frac{2}{3!}x^3 = x-\frac{x^2}{2}+\frac{x^3}{3}\).

Polar Coordinates & Parametric Equations

Polar & Parametric

Polar area: \(A=\dfrac{1}{2}\displaystyle\int_\alpha^\beta r^2\,d\theta\)

Parametric slope: \(\dfrac{dy}{dx}=\dfrac{dy/dt}{dx/dt}\)

Parametric arc length: \(L=\displaystyle\int_a^b\!\sqrt{\left(\frac{dx}{dt}\right)^2+\left(\frac{dy}{dt}\right)^2}\,dt\)

Parametric Calculus Medium

If \(x=t^2\) and \(y=t^3\), find \(\dfrac{dy}{dx}\).

\(\dfrac{3t}{2}\)

\(\dfrac{2}{3t}\)

\(3t^2\)

\(\dfrac{3t^2}{2t}=\dfrac{3t}{2}\) (same as A)

✓ Solution

\(\dfrac{dx}{dt}=2t\), \(\dfrac{dy}{dt}=3t^2\).
\(\dfrac{dy}{dx}=\dfrac{3t^2}{2t}=\dfrac{3t}{2}\). Note: options A and D are identical — the answer is \(\dfrac{3t}{2}\).

Polar Area Hard

Find the area enclosed by \(r=2\cos\theta\) (one full loop).

\(\pi\)

\(2\pi\)

\(4\)

\(\dfrac{\pi}{2}\)

✓ Solution

\(r=2\cos\theta\) is a circle of radius 1. Area \(=\pi r^2=\pi\cdot 1^2=\pi\).
Via formula: \(A=\frac{1}{2}\int_{-\pi/2}^{\pi/2}(2\cos\theta)^2\,d\theta=2\int_{-\pi/2}^{\pi/2}\cos^2\theta\,d\theta=2\cdot\frac{\pi}{2}=\pi\).

Arc Length & Surface Area

Arc Length: \(L=\displaystyle\int_a^b\sqrt{1+\left(\frac{dy}{dx}\right)^2}\,dx\)

Surface of Revolution (about \(x\)-axis): \(S=2\pi\displaystyle\int_a^b y\sqrt{1+(y')^2}\,dx\)

Arc Length Hard

Set up the integral for the arc length of \(y=x^2\) from \(x=0\) to \(x=1\). Which is correct?

\(\displaystyle\int_0^1 \sqrt{1+4x^2}\,dx\)

\(\displaystyle\int_0^1 \sqrt{1+x^2}\,dx\)

\(\displaystyle\int_0^1 \sqrt{1+2x}\,dx\)

\(\displaystyle\int_0^1 (1+4x^2)\,dx\)

✓ Solution

\(y=x^2\Rightarrow y'=2x\Rightarrow (y')^2=4x^2\).
Arc length \(=\displaystyle\int_0^1\sqrt{1+(2x)^2}\,dx=\int_0^1\sqrt{1+4x^2}\,dx\).

Surface Area Advanced

The surface area generated by revolving \(y=\sqrt{x}\), \(0\le x\le 4\), about the \(x\)-axis is:

\(\dfrac{\pi}{6}(17\sqrt{17}-1)\)

\(\pi(17\sqrt{17}-1)\)

\(\dfrac{\pi}{3}(17\sqrt{17}-1)\)

\(2\pi\sqrt{17}\)

✓ Solution

\(y=\sqrt{x}\Rightarrow y'=\frac{1}{2\sqrt{x}}\Rightarrow 1+(y')^2=1+\frac{1}{4x}=\frac{4x+1}{4x}\).
\(S=2\pi\int_0^4\sqrt{x}\cdot\sqrt{\frac{4x+1}{4x}}\,dx=2\pi\int_0^4\frac{\sqrt{4x+1}}{2}\,dx=\pi\int_0^4\sqrt{4x+1}\,dx\).
Let \(u=4x+1\), \(du=4\,dx\): \(S=\frac{\pi}{4}\cdot\frac{2}{3}\left[u^{3/2}\right]_1^{17}=\frac{\pi}{6}(17^{3/2}-1)=\frac{\pi}{6}(17\sqrt{17}-1)\).

Differential Equations

ODE Methods

Separable: \(\frac{dy}{dx}=g(x)h(y)\Rightarrow\int\frac{dy}{h(y)}=\int g(x)\,dx\)

First-order linear: \(\frac{dy}{dx}+P(x)y=Q(x)\). Integrating factor: \(\mu=e^{\int P\,dx}\)

Solution: \(y=\frac{1}{\mu}\int\mu Q\,dx\)

Separable ODE Medium

Solve \(\dfrac{dy}{dx} = xy\) with \(y(0)=1\).

\(y = e^{x^2/2}\)

\(y = e^{x^2}\)

\(y = e^x\)

\(y = x^2 + 1\)

✓ Solution

Separate: \(\dfrac{dy}{y}=x\,dx\). Integrate: \(\ln|y|=\frac{x^2}{2}+C\). So \(y=Ae^{x^2/2}\).
Apply IC: \(y(0)=A=1\). Therefore \(y=e^{x^2/2}\).

Linear First-Order ODE Hard

Solve \(\dfrac{dy}{dx} + 2y = e^{-2x}\).

\(y = (x+C)e^{-2x}\)

\(y = Ce^{-2x}\)

\(y = xe^{-2x}+Ce^{-2x}\)

\(y = xe^{2x}+C\)

✓ Solution

Integrating factor: \(\mu=e^{\int 2\,dx}=e^{2x}\).
Multiply: \(e^{2x}\frac{dy}{dx}+2e^{2x}y=1\Rightarrow\frac{d}{dx}(ye^{2x})=1\).
Integrate: \(ye^{2x}=x+C\Rightarrow y=(x+C)e^{-2x}\).

Applications of Integration

Areas & Volumes

Area between curves: \(A=\displaystyle\int_a^b[f(x)-g(x)]\,dx\) where \(f\ge g\)

Disk method: \(V=\pi\displaystyle\int_a^b [f(x)]^2\,dx\)

Shell method: \(V=2\pi\displaystyle\int_a^b x\,f(x)\,dx\)

Washer method: \(V=\pi\displaystyle\int_a^b\!\left([f(x)]^2-[g(x)]^2\right)\!dx\)

Volumes of Revolution Hard

Find the volume of the solid formed by revolving \(y=x^2\) from \(x=0\) to \(x=1\) about the \(x\)-axis.

\(\dfrac{\pi}{3}\)

\(\dfrac{\pi}{5}\)

\(\dfrac{2\pi}{5}\)

\(\pi\)

✓ Solution

Disk method: \(V=\pi\displaystyle\int_0^1(x^2)^2\,dx=\pi\int_0^1 x^4\,dx=\pi\left[\frac{x^5}{5}\right]_0^1=\frac{\pi}{5}\).

Area Between Curves Advanced

Find the area enclosed between \(y=x^2\) and \(y=x\).

\(\dfrac{1}{6}\)

\(\dfrac{1}{3}\)

\(\dfrac{1}{2}\)

\(\dfrac{1}{4}\)

✓ Solution

Intersections: \(x^2=x\Rightarrow x=0,1\). On \([0,1]\), \(x\ge x^2\).
\(A=\displaystyle\int_0^1(x-x^2)\,dx=\left[\frac{x^2}{2}-\frac{x^3}{3}\right]_0^1=\frac{1}{2}-\frac{1}{3}=\frac{1}{6}\).

Calculus II
Mastery Exam

—

Answer Key & Solutions

Calculus IIMastery Exam

—

Answer Key & Solutions

Calculus II
Mastery Exam