A-Level Mathematics – Chapter 7: Integration

Example 7.1.1 — Basic Power Rule

Find $\displaystyle\int (3x^2 - 4x + 5)\,dx$.

Step 1 Integrate each term separately using $\int x^n\,dx = \frac{x^{n+1}}{n+1} + c$:

$$\int 3x^2\,dx = \frac{3x^3}{3} = x^3 \qquad \int 4x\,dx = \frac{4x^2}{2} = 2x^2 \qquad \int 5\,dx = 5x$$

Step 2 Combine and add a single constant of integration:

$$\int(3x^2 - 4x + 5)\,dx = x^3 - 2x^2 + 5x + c$$

Example 7.1.2 — Negative and Fractional Indices

Find $\displaystyle\int \left(x^{1/2} + \frac{2}{x^3}\right)dx$.

Step 1 Rewrite $\frac{2}{x^3} = 2x^{-3}$.

Step 2 Apply the power rule to each term:

$$\int x^{1/2}\,dx = \frac{x^{3/2}}{3/2} = \frac{2}{3}x^{3/2} \qquad \int 2x^{-3}\,dx = \frac{2x^{-2}}{-2} = -x^{-2}$$

Result $\displaystyle\int\!\left(x^{1/2} + \frac{2}{x^3}\right)dx = \tfrac{2}{3}x^{3/2} - x^{-2} + c$

Example 7.1.3 — Exponential and Trigonometric

Find $\displaystyle\int(e^{2x} + 3\sin x - 4\cos x)\,dx$.

$$= \frac{1}{2}e^{2x} + 3(-\cos x) - 4(\sin x) + c = \frac{1}{2}e^{2x} - 3\cos x - 4\sin x + c$$

Example 7.1.4 — Finding a Particular Integral

Given that $\frac{dy}{dx} = 6x^2 - 2x$ and $y = 5$ when $x = 1$, find $y$ in terms of $x$.

Step 1 Integrate: $y = 2x^3 - x^2 + c$.

Step 2 Substitute the initial condition $x=1$, $y=5$: $5 = 2(1) - 1 + c \Rightarrow c = 4$.

Result $y = 2x^3 - x^2 + 4$.

Example 7.2.1 — Evaluating a Definite Integral

Evaluate $\displaystyle\int_1^3 (x^2 + 1)\,dx$.

$$\left[\frac{x^3}{3} + x\right]_1^3 = \left(\frac{27}{3} + 3\right) - \left(\frac{1}{3} + 1\right) = 12 - \frac{4}{3} = \frac{32}{3}$$

Example 7.2.2 — Area Below the Axis

Find the total area enclosed between $y = x^2 - 4$ and the $x$-axis.

Step 1 The curve crosses the $x$-axis where $x^2 - 4 = 0$, i.e.\ $x = \pm 2$.

Step 2 For $-2 \leq x \leq 2$, the curve is below the axis. So the area is:

$$A = \left|\int_{-2}^{2}(x^2-4)\,dx\right| = \left|\left[\frac{x^3}{3} - 4x\right]_{-2}^{2}\right| = \left|\left(\frac{8}{3}-8\right)-\left(\frac{-8}{3}+8\right)\right| = \left|\!-\frac{32}{3}\right| = \frac{32}{3}$$

Example 7.2.3 — Area Between Two Curves

Find the area enclosed between $y = 4 - x^2$ and $y = x + 2$.

Step 1 Find intersections: $4 - x^2 = x + 2 \Rightarrow x^2 + x - 2 = 0 \Rightarrow (x+2)(x-1) = 0$, so $x = -2$ and $x = 1$.

Step 2 On $[-2,1]$, $4 - x^2 \geq x + 2$. Area:

$$\int_{-2}^{1}\bigl[(4-x^2)-(x+2)\bigr]\,dx = \int_{-2}^{1}(2 - x - x^2)\,dx = \left[2x - \frac{x^2}{2} - \frac{x^3}{3}\right]_{-2}^{1} = \frac{9}{2}$$

Example 7.3.1 — Polynomial Substitution

Find $\displaystyle\int 2x(x^2 + 3)^4\,dx$.

Let $u = x^2 + 3 \Rightarrow du = 2x\,dx$.

$$\int u^4\,du = \frac{u^5}{5} + c = \frac{(x^2+3)^5}{5} + c$$

Example 7.3.2 — Trigonometric Substitution

Find $\displaystyle\int \sin^3 x \cos x\,dx$.

Let $u = \sin x \Rightarrow du = \cos x\,dx$.

$$\int u^3\,du = \frac{u^4}{4} + c = \frac{\sin^4 x}{4} + c$$

Example 7.3.3 — Exponential Substitution

Find $\displaystyle\int x\,e^{x^2}\,dx$.

Let $u = x^2 \Rightarrow du = 2x\,dx$, so $x\,dx = \frac{1}{2}\,du$.

$$\int \frac{1}{2}e^u\,du = \frac{1}{2}e^u + c = \frac{1}{2}e^{x^2} + c$$

Example 7.3.4 — Definite Integral with Changed Limits

Evaluate $\displaystyle\int_0^1 \frac{x}{(1+x^2)^2}\,dx$.

Let $u = 1 + x^2 \Rightarrow du = 2x\,dx$. When $x=0$, $u=1$; when $x=1$, $u=2$.

$$\int_1^2 \frac{1}{2u^2}\,du = \left[-\frac{1}{2u}\right]_1^2 = -\frac{1}{4} + \frac{1}{2} = \frac{1}{4}$$

Example 7.4.1 — Polynomial × Exponential

Find $\displaystyle\int x\,e^x\,dx$.

Let $u = x$ and $\frac{dv}{dx} = e^x$, so $\frac{du}{dx} = 1$ and $v = e^x$.

$$\int x\,e^x\,dx = xe^x - \int e^x\,dx = xe^x - e^x + c = e^x(x-1) + c$$

Example 7.4.2 — Polynomial × Trigonometric

Find $\displaystyle\int x\cos x\,dx$.

Let $u = x$, $\frac{dv}{dx} = \cos x$, so $\frac{du}{dx} = 1$, $v = \sin x$.

$$\int x\cos x\,dx = x\sin x - \int \sin x\,dx = x\sin x + \cos x + c$$

Example 7.4.3 — Logarithm (Special Case)

Find $\displaystyle\int \ln x\,dx$.

Write as $\int \ln x \cdot 1\,dx$. Let $u = \ln x$, $\frac{dv}{dx} = 1$, so $\frac{du}{dx} = \frac{1}{x}$, $v = x$.

$$\int \ln x\,dx = x\ln x - \int x \cdot \frac{1}{x}\,dx = x\ln x - x + c$$

Example 7.4.4 — Applying Twice

Find $\displaystyle\int x^2 e^x\,dx$.

First application: $u = x^2$, $v = e^x$: $\int x^2 e^x\,dx = x^2 e^x - 2\int xe^x\,dx$.

Second application (from Example 7.4.1): $\int xe^x\,dx = e^x(x-1) + c$.

$$\int x^2 e^x\,dx = x^2 e^x - 2e^x(x-1) + c = e^x(x^2 - 2x + 2) + c$$

Example 7.5.1 — Distinct Linear Factors

Find $\displaystyle\int \frac{5x - 1}{(x+1)(2x-1)}\,dx$.

Step 1 Decompose: $\frac{5x-1}{(x+1)(2x-1)} = \frac{A}{x+1} + \frac{B}{2x-1}$.

Comparing numerators: $5x - 1 = A(2x-1) + B(x+1)$. Setting $x = -1$: $A = 2$; $x = \frac{1}{2}$: $B = \frac{3}{2} \cdot \frac{1}{1} = \frac{3}{2}$.

Step 2 Integrate: $\displaystyle\int\!\left(\frac{2}{x+1} + \frac{3/2}{2x-1}\right)dx = 2\ln|x+1| + \frac{3}{4}\ln|2x-1| + c$.

Example 7.5.2 — Repeated Linear Factor

Find $\displaystyle\int \frac{3x}{(x-1)^2}\,dx$.

Step 1 Decompose: $\frac{3x}{(x-1)^2} = \frac{A}{x-1} + \frac{B}{(x-1)^2}$. This gives $A = 3$, $B = 3$.

Step 2 Integrate: $3\ln|x-1| - \frac{3}{x-1} + c$.

Example 7.6.1 — Applying the Trapezium Rule

Use the trapezium rule with 4 strips to estimate $\displaystyle\int_0^2 e^{x/2}\,dx$.

Setup $h = 0.5$; ordinates at $x = 0, 0.5, 1, 1.5, 2$:

$y_0 = e^0 = 1$, $y_1 = e^{0.25} \approx 1.2840$, $y_2 = e^{0.5} \approx 1.6487$, $y_3 = e^{0.75} \approx 2.1170$, $y_4 = e^1 \approx 2.7183$.

$$\approx \frac{0.5}{2}\bigl(1 + 2(1.2840 + 1.6487 + 2.1170) + 2.7183\bigr) = 0.25 \times 14.1167 \approx 3.529$$

The exact value is $2(e-1) \approx 3.436$; percentage error $\approx 2.7\%$.

Example 7.6.2 — Error and Improvement

Explain how to reduce the error in the trapezium rule, and state whether the rule over- or under-estimates for a convex function.

Increasing the number of strips $n$ reduces the error, which is $O(h^2)$ — doubling $n$ roughly quarters the error. For a convex function ($f''(x) > 0$), the straight-line tops of the trapezoids lie above the curve, so the rule over-estimates. For a concave function ($f''(x) < 0$), it under-estimates.

Example 7.7.1 — Basic Separation

Solve $\dfrac{dy}{dx} = 2xy$.

$$\frac{1}{y}\,dy = 2x\,dx \Rightarrow \int \frac{1}{y}\,dy = \int 2x\,dx \Rightarrow \ln|y| = x^2 + c$$

Exponentiating: $|y| = e^c \cdot e^{x^2}$, so $y = Ae^{x^2}$ where $A$ is an arbitrary constant.

Example 7.7.2 — Initial Value Problem

Solve $\dfrac{dy}{dx} = \dfrac{x}{y}$ given $y = 3$ when $x = 0$.

$$y\,dy = x\,dx \Rightarrow \frac{y^2}{2} = \frac{x^2}{2} + c$$

Applying $y=3$, $x=0$: $\frac{9}{2} = 0 + c$, so $c = \frac{9}{2}$. The particular solution is $y^2 = x^2 + 9$, i.e.\ $y = \sqrt{x^2+9}$ (positive root since $y=3>0$).

Example 7.7.3 — Exponential Growth/Decay

The rate of decay of a radioactive substance is proportional to the amount $N$ present. Write down and solve the differential equation, given $N = N_0$ at $t = 0$.

$$\frac{dN}{dt} = -kN \quad (k > 0) \Rightarrow \frac{dN}{N} = -k\,dt \Rightarrow \ln N = -kt + c$$

Applying initial condition: $N = N_0 e^{-kt}$.

Example 7.7.4 — Mixed Variables

Solve $\dfrac{dy}{dx} = \dfrac{y^2 + 1}{x}$, given $y = 1$ when $x = 1$.

$$\frac{dy}{y^2+1} = \frac{dx}{x} \Rightarrow \arctan y = \ln|x| + c$$

At $x=1$, $y=1$: $\arctan 1 = 0 + c$, so $c = \frac{\pi}{4}$. Hence $y = \tan\!\left(\ln x + \dfrac{\pi}{4}\right)$.