Algebra

Solving equations[edit | edit source]

Definitions[edit | edit source]

Expression[edit | edit source]

= any form of showing a mathematical value

ex. the number 2 may be "expressed" as either "2" or "1+1"
more complex "expressions" involve variables, such as "2y -5 = 10"
- here, the value (expression) "10" can also be "expressed" as "2y - 5"

Equation[edit | edit source]

= a statement that uses an equal sign (=)

which means that the expressions on both side of the equal sign have the same value

Inverse Operation[edit | edit source]

= a method for isolating variables by adding or multiplying a value to both sides of an equation

the "inverse operation" reduces the value of the property on the side of the variable to 1 or 0

that way the variable becomes "isolated" on one side of the equation

ex.:
- $x+3=8$
the "inverse operation" adds -3 to both sides of the equation:
- $x+3-3=8-3$

which leaves us with
- $x+0=5$
- $x=5$

Operation[edit | edit source]

= a process to change a value

addition, subtraction, multiplication and division are the fundamental "operations" of math

Property[edit | edit source]

= the rule that is applied to numbers in an equation
the property applied must be the same for both sides of the equation!
properties include
- Addition property (or subtraction)
- Multiplication property (or division)

Isolating the variable[edit | edit source]

Equations are solved by "isolating the variable"
- which means "expressing" the unknown value by itself on one side of an equation
  - ex. to solve, "4 + x = 6" , we want to "isolate" x, so that we have "x = ___"

Properties of Equality[edit | edit source]

property = a rule
equality = that both sides of the equation (equal sign) have the same value

Variable[edit | edit source]

an unknown value represented, usually represented by the letter $x$

How to solve an equation with a single variable[edit | edit source]

Using Addition Property[edit | edit source]

when solving for $x$ $x$ when $x$ $x$ is added or subtracted to/from another number
- we "isolate $x$ " by using the "Inverse Operation" to remove the number from the side with the variable, $x$
- note that
  - addition is adding a positive number: $5+(+3)=8$ $5+(+3)=8$
    - where $(+3)$ means "positive 3"
  - subtraction is adding a negative number: $5+(-3)=2$ $5+(-3)=2$
    - where $(-3)$ means "negative 3"
examples:

Properties of Equality
		Addition Property
Equation		$x+4=6$		$x-3=4$
Inverse Operation	add $-4$ to both sides (i.e. subtract 4)	$x+4+(-4)=6+(-4)$	add $+3$ to both sides (i.e. add 3)	$x-3+(3)=6+(3)$
Solution		$x+0=2$		$x+0=9$
		$x=2$		$x=9$

another way to look at the Inverse Operation, using the same equations is:

Properties of Equality
Addition Property
Equation		$x+4=6$		$x-3=4$
Inverse Operation	add $-4$ to both sides (i.e. subtract 4)	$x+4=6$ $-4\|-4$	add $+3$ to both sides (i.e. add 3)	$x-3=6$ $+3\|+3$
Inverse Operation	simplify	$x+0=2$	simplify	$x+0=9$
Solution		$x=2$		$x=9$

Using Multiplication Property[edit | edit source]

Properties of Equality
Multiplication Property
Equation		${\frac {x}{6}}=4$		$6x=24$
Inverse Operation	multiply both sides by 6 (isolates x by making the expression $x{\frac {6}{6}}$ which is equal to $x\times 1$ )	${\frac {6\times x}{6}}={4}\times 6$	divide both sides by 6 (isolate $x$ by making the expression $x{\frac {6}{6}}$ which is equal to $x\times 1$ )	${\frac {6x}{6}}={\frac {24}{6}}$
	cancel $6\div 6$ (because $6\div 6$ $=1$ )	${\frac {{\cancel {6}}\times x}{\cancel {6}}}={4}\times 6$	cancel $6\div 6$ (because $6\div 6$ $=1$ ) (note: ${\frac {24}{6}}$ is the same as $24\div 6$ )	${\frac {{\cancel {6}}\times x}{\cancel {6}}}={\frac {24}{6}}$
Solution		$x=24$		$x=4$

Cross-multiplying[edit | edit source]

use cross-multiplication to solve for $x$ when $x$ is a denominator (bottom of a fraction)

see for numerators and denominators

How to solve for $x$ when $x$ is a denominator: "Cross-multiplication"[edit | edit source]

Using Cross-Multiplication
${\frac {6}{x}}=8$	is the same as	${\frac {6}{x}}={\frac {8}{1}}$
using cross-multiplication, we can move the variable $x$ to the top of the fraction (numerator)
${\frac {6}{x}}={\frac {8}{1}}$	is the same as (using cross-multiplication)	$8x=6\times 1$
	now we can solve for $x$
$8x=6\times 1$	$8x=16$ ${\frac {8\times x}{8}}={\frac {16}{8}}$ $x={\frac {16}{8}}$	$x=2$

How to solve an equation with two of the same variables[edit | edit source]

when an equation has two of the same variables, we isolate the variable by combining its instances
ex.
- $2x+5x=35$
- the values $2x$ and $5x$ may be "distributed" in order to make a single instance of $x$ and thereby allowing for it to be isolated

Distributive property[edit | edit source]

= the idea that multiplication can be "distributed" through addition

multiplication is addition by a certain factor (number of times)
ex. when we multiply $5\times 5$ $5\times 5$ , we are adding 5 five times: $5\times 5=5+5+5+5+5$ $5\times 5=5+5+5+5+5$
- that is the same as adding $(2+3)$ five times
- so we can express $(2+3)$ $(2+3)$ times 5 as either
  - $5\times (2+3)$ or
  - $5\times (5)$ or
  - $(5\times 2)+(5\times 3)$ $(5\times 2)+(5\times 3)$
    - they all equal 25
with variables, we use the process:
- $2x+5x$ =
- $x\times (2+5)$ =
- $x\times 7$ = 7 $x$