Mathematics revolves around Algebra, so sufficient knowledge of this is essential. You should recognise most of this from your GCSE course, but it's important to ensure you understand this.

Pure Maths 1, Module 1, Algebra[edit | edit source]

Collecting like terms[edit | edit source]

Several terms in the same unknown can be contracted, or collected together, making them much easier to work with, for example, ${\displaystyle 6x+2x=8x}$, similarly, the same works with subtraction, ${\displaystyle 5y-3y}$ is the same as ${\displaystyle 2y}$.

Laws of indices[edit | edit source]

1. ${\displaystyle x^{a}\times x^{b}=x^{a+b}}$.

For example, ${\displaystyle x^{3}\times x^{2}}$. This is the same as ${\displaystyle (x\times x\times x)\times (x\times x)}$. Or ${\displaystyle x\times x\times x\times x\times x=x^{5}=x^{3+2}}$

2. ${\displaystyle x^{a}\div x^{b}=x^{a-b}}$.

For example, ${\displaystyle x^{5}\div x^{3}}$, expands to ${\displaystyle {\frac {x\times x\times x\times x\times x}{x\times x\times x}}}$. Three of the ${\displaystyle x}$'s on the top line cancel out, leaving us with ${\displaystyle x\times x=x^{2}=x^{5-3}}$

3. ${\displaystyle (x^{a})^{b}=x^{a\times b}}$

For example, ${\displaystyle (4^{2})^{3}=(4\times 4)\times (4\times 4)\times (4\times 4)}$ or ${\displaystyle 4^{6}}$

4. ${\displaystyle x^{0}=1}$ where ${\displaystyle x\neq 0}$

For example, ${\displaystyle 5^{0}\times 6=1\times 6=6}$

5. ${\displaystyle x^{\frac {a}{b}}={\sqrt[{b}]{x^{a}}}=({\sqrt[{b}]{x}})^{a}}$

For example, ${\displaystyle 8^{\frac {2}{3}}={\sqrt[{3}]{8}}^{2}=2^{2}=4.}$

Expanding and factorising expressions[edit | edit source]

Manipulation of surds[edit | edit source]

A surd is an irrational number, meaning it cannot be written exactly in decimal or fractional form, an example is ${\displaystyle {\sqrt {2}}}$, numbers are written in surd form because writing it any other way would reduce the accuracy, and in mathematics an exact value is needed. There are two rules of surd manipulation required for C1:

1. ${\displaystyle {\sqrt {xy}}={\sqrt {x}}\times {\sqrt {y}}}$

For example, ${\displaystyle {\sqrt {16\times 25}}=20={\sqrt {16}}\times {\sqrt {25}}}$.

2. ${\displaystyle {\sqrt {\frac {x}{y}}}={\frac {\sqrt {x}}{\sqrt {y}}}}$

For example,  ${\displaystyle {\sqrt {\frac {5}{4}}}={\frac {\sqrt {5}}{\sqrt {4}}}={\frac {\sqrt {5}}{2}}}$

Sometimes a surd may need to be expressed as ${\displaystyle x{\sqrt {y}}}$, this is done by finding a square number, like 4 or 9, that multiplies into the surd, which then can be taken outside the square root and put in front:

For example,  ${\displaystyle {\sqrt {45}}={\sqrt {9\times 5}}={\sqrt {9}}{\sqrt {5}}=3{\sqrt {5}}}$

Quadratic functions[edit | edit source]

Graphs[edit | edit source]

The general form of a quadratic equation is ${\displaystyle \textstyle y=f(x)=ax^{2}+bx+c,a\neq 0}$, where a, b, and c are constants.

A graph can be sketched by simply taking values of ${\displaystyle x}$ and calculating the values of ${\displaystyle y}$ using the equation of the graph given. These values can then be plotted onto the graph:

For example, ${\displaystyle \textstyle y=x^{2}-3x-4}$, then taking x between -2 and +5 gives:

x	-2	-1	0	1	2	3	4	5
y = x2-3x-4	6	0	-4	-6	-6	-4	0	6

Factorisiation[edit | edit source]

Completing the Square[edit | edit source]

Quadratic formula[edit | edit source]

Sketching Graphs[edit | edit source]

Equations and Inequalities[edit | edit source]

Simultaneous Equations[edit | edit source]

Simultaneous equations are two or more equations where you have to find values for unknowns that satisfy both. There are two methods you need to know about for solving them.

Elimination[edit | edit source]

Elimination involves 'taking away' or 'adding' the two equations together to eliminate on of the two unknowns. Here's an example:

${\displaystyle {\begin{array}{lcl}5x+4y&=&33\\6x-4y&=&22\end{array}}}$

In this case, adding the equations together will eliminate y:

${\displaystyle {\begin{array}{lclc}&5x+4y&=&33\\+&6x-4y&=&22\\\Rightarrow &11x+0y&=&55\end{array}}}$

We can then solve ${\displaystyle 11x=55}$ to get ${\displaystyle x=5}$. This value of x can then be put back into one of the original equations to find the value of y:

${\displaystyle {\begin{array}{l}5x+4y=33\\25+4y=33\\4y=8\\y=2\end{array}}}$

Sometimes, you may have to change one of the equations to be able to use elimination. Look at the following two:

${\displaystyle {\begin{array}{lcl}3x+4y&=&14\\5x+8y&=&24\end{array}}}$

Neither of the unknowns can be eliminated at the moment but by multiplying the whole of the first equation by 2 it makes it possible to eliminate by taking one away from the other:

${\displaystyle {\begin{array}{lclc}&6x+8y&=&28\\-&5x+8y&=&24\\\Rightarrow &1x+0y&=&4\end{array}}}$

This can then be substituted back into one of the original equations to find y:

${\displaystyle {\begin{array}{l}5x+8y=24\\20+8y=24\\8y=4\\y={\frac {1}{2}}\end{array}}}$

Substitution[edit | edit source]

Inequalities[edit | edit source]

Linear[edit | edit source]

Inequalities can be manipulated in the same way an equation can be with an extra rule: when multiplying or dividing by a negative value, the greater/less than must be switched to the other.

For example:

${\displaystyle {\begin{aligned}-6x+3&>-9\\-6x&>-12\\x&<2\end{aligned}}}$

Quadratic[edit | edit source]

Critical values[edit | edit source]

For the inequality ${\displaystyle ax^{2}+bx+x<0}$, consider the corresponding equation ${\displaystyle ax^{2}+bx+c=0}$. Solve the equation for x; the two values of x you obtain are known as the critical values, and represent the limits between which the solutions for the inequality lie. For example:

${\displaystyle \displaystyle x^{2}-2x-3=0}$

${\displaystyle \displaystyle (x+1)(x-3)=0}$

${\displaystyle \displaystyle x=-1}$ or ${\displaystyle \displaystyle x=3}$.

Therefore critical values are -1 and 3.

In the above example, the solution is either ${\displaystyle -1<x<3}$ or ${\displaystyle x<-1;x>3}$. To determine which one it is, plug in any value, apart from the critical values, into the original inequality and see if the inequality is true, if it is the value you plugged in is in the solution set.

Continuing from the above example, let ${\displaystyle x=0}$.

${\displaystyle 0-0-3<0}$

This shows that 0 is a solution, and as it lies in ${\displaystyle -1<x<3}$, ${\displaystyle -1<x<3}$ is the solution