A-level Mathematics/OCR/C2/Appendix A: Formulae

By the end of this module you will be expected to have learnt the following formulae:

Dividing and Factoring Polynomials

Remainder Theorem

If you have a polynomial f(x) divided by x - c, the remainder is equal to f(c). Note if the equation is x + c then you need to negate c: f(-c).

The Factor Theorem

A polynomial f(x) has a factor x - c if and only if f(c) = 0. Note if the equation is x + c then you need to negate c: f(-c).

Formula For Exponential and Logarithmic Function

The Laws of Exponents

$b^{x}b^{y}=b^{x+y}\,$
${\frac {b^{x}}{b^{y}}}=b^{x-y}$
$\left(b^{x}\right)^{y}=b^{xy}$
$a^{n}b^{n}=\left(ab\right)^{n}\,$
$\left({\frac {a}{b}}\right)^{n}={\frac {a^{n}}{b^{n}}}$
$b^{-n}={\frac {1}{b^{n}}}$
$b^{\frac {c}{x}}=\left({\sqrt[{x}]{b}}\right)^{c}$ where c is a constant
$b^{1}=b\,$
$b^{0}=1\,$

Logarithmic Function

The inverse of

y=b^{x}\,

x=b^{y}\,

which is equivalent to

y=\log _{b}x\,

Change of Base Rule: $\log _{a}x\,$ can be written as ${\frac {\log _{b}x}{\log _{b}a}}$

Laws of Logarithmic Functions

When X and Y are positive.

$\log _{b}XY=\log _{b}X+\log _{b}Y\,$
$\log _{b}{\frac {X}{Y}}=\log _{b}X-\log _{b}Y\,$
$\log _{b}X^{k}=k\log _{b}X\,$

Circles and Angles

Conversion of Degree Minutes and Seconds to a Decimal

$X+{\frac {Y}{60}}+{\frac {Z}{3600}}$ where X is the degree, y is the minutes, and z is the seconds.

Arc Length

$s=\theta r\,$ Note: θ need to be in radians

Area of a Sector

$Area={\frac {1}{2}}r^{2}\theta$ Note: θ need to be in radians.

Trigonometry

The Trigonometric Ratios Of An Angle

Function	Written	Defined	Inverse Function	Written	Equivalent to
Cosine	$\cos \theta \,$	${\frac {Adjacent}{Hypotenuse}}$	$\arccos \theta \,$	$\cos ^{-1}\theta \,$	$x=\cos \ y\,$
Sine	$\sin \theta \,$	${\frac {Opposite}{Hypotenuse}}$	$\arcsin \theta \,$	$\sin ^{-1}\theta \,$	$x=\sin \ y\,$
Tangent	$\tan \theta \,$	${\frac {Opposite}{Adjacent}}$	$\arctan \theta \,$	$\tan ^{-1}\theta \,$	$x=\tan \ y\,$

Important Trigonometric Values

You need to have these values memorized.

$\theta \,$	$rad\,$	$\sin \theta \,$	$\cos \theta \,$	$\tan \theta \,$
$0^{\circ }$	0	0	1	0
$30^{\circ }$	${\frac {\pi }{6}}$	${\frac {1}{2}}$	${\frac {\sqrt {3}}{2}}$	${\frac {1}{\sqrt {3}}}$
$45^{\circ }$	${\frac {\pi }{4}}$	${\frac {\sqrt {2}}{2}}$	${\frac {\sqrt {2}}{2}}$	$1\,$
$60^{\circ }$	${\frac {\pi }{3}}$	${\frac {\sqrt {3}}{2}}$	${\frac {\sqrt {1}}{2}}$	${\sqrt {3}}$
$90^{\circ }$	${\frac {\pi }{2}}$	1	0	-

The Law of Cosines

a^{2}=b^{2}+c^{2}-2bc\cos \alpha \,

$b^{2}=a^{2}+c^{2}-2ac\cos \beta \,$

$c^{2}=a^{2}+b^{2}-2ab\cos \gamma \,$

The Law of Sines

${\frac {a}{\sin \alpha }}={\frac {b}{\sin \beta }}={\frac {c}{\sin \gamma }}$

Area of a Triangle

Area={\frac {1}{2}}bc\sin \alpha \,

$Area={\frac {1}{2}}ac\sin \beta \,$

$Area={\frac {1}{2}}ab\sin \gamma \,$

Trigonometric Identities

\sin ^{2}\theta +\cos ^{2}\theta =1\,

$tan\theta ={\frac {\sin \theta }{\cos \theta }}$

Integration

Integration Rules

The reason that we add a + C when we compute the integral is because the derivative of a constant is zero, therefore we have an unknown constant when we compute the integral.

\int x^{n}\,dx={\frac {1}{n+1}}x^{n+1}+C,\ (n\neq -1)

$\int kx^{n}\,dx=k\int x^{n}\,dx$

$\int \left\{f^{'}(x)+g^{'}(x)\right\}\,dx=f(x)+g(x)+C$

$\int \left\{f^{'}(x)-g^{'}(x)\right\}\,dx=f(x)-g(x)+C$

Rules of Definite Integrals

$\int _{a}^{b}f\left(x\right)\ dx=F\left(b\right)-F\left(a\right)$ , F is the anti derivative of f such that F' = f
$\int _{a}^{b}f\left(x\right)\ dx=-\int _{b}^{a}f\left(x\right)\ dx$
$\int _{a}^{a}f\left(x\right)\ dx=0$
Area between a curve and the x-axis is $\int _{a}^{b}y\,dx\ ({\mbox{for}}\ y\geq 0)$
Area between a curve and the y-axis is $\int _{a}^{b}x\,dy\ ({\mbox{for}}\ x\geq 0)$
Area between curves is $\int _{a}^{b}{\begin{vmatrix}f\left(x\right)-g\left(x\right)\end{vmatrix}}dx$

Trapezium Rule

\int _{a}^{b}y\,dx\approx {\frac {1}{2}}h\left\{\left(y_{0}+y_{n}\right)+2\left(y_{1}+y_{2}+\ldots +y_{n-1}\right)\right\}

Where: $h={\frac {b-a}{n}}$

Midpoint Rule

\int _{a}^{b}f\left(x\right)\,dx\approx =h\left[f\left(x_{1}\right)+f\left(x_{2}\right)+\ldots +f\left(x_{n}\right)\right]

Where: $h={\frac {b-a}{n}}$ n is the number of strips.

and $x_{i}={\frac {1}{2}}\left[\left(a+\left\{i-1\right\}h\right)+\left(a+ih\right)\right]$

This is part of the C2 (Core Mathematics 2) module of the A-level Mathematics text.

Dividing and Factoring Polynomials / Sequences and Series / Logarithms and Exponentials / Circles and Angles / Integration

Appendix A: Formulae

This article is issued from Wikibooks. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.