Algebra

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Solving equations

Definitions

Expression

= 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

= 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

= 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.:
  • the "inverse operation" adds -3 to both sides of the equation:
  • which leaves us with

Operation

= a process to change a value

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

Property

  • = 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

  • 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

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

Variable

  • an unknown value represented, usually represented by the letter

How to solve an equation with a single variable

Using Addition Property

  • when solving for when is added or subtracted to/from another number
    • we "isolate " by using the "Inverse Operation" to remove the number from the side with the variable,
    • note that
      • addition is adding a positive number:
        • where means "positive 3"
      • subtraction is adding a negative number:
        • where means "negative 3"
  • examples:
Properties of Equality
Addition Property
Equation
Inverse Operation add to both sides

(i.e. subtract 4)

add to both sides

(i.e. add 3)

Solution
  • another way to look at the Inverse Operation, using the same equations is:
Properties of Equality
Addition Property
Equation
Inverse Operation add to both sides

(i.e. subtract 4)

add to both sides

(i.e. add 3)

simplify simplify
Solution

Using Multiplication Property

Properties of Equality
Multiplication Property
Equation
Inverse Operation multiply both sides by 6

(isolates x by making the expression which is equal to )

divide both sides by 6

(isolate by making the expression which is equal to )

cancel

(because )

cancel

(because )

(note: is the same as )

Solution

Cross-multiplying

  • use cross-multiplication to solve for when is a denominator (bottom of a fraction)
  • see for numerators and denominators

How to solve for when is a denominator: "Cross-multiplication"

Using Cross-Multiplication
is the same as
using cross-multiplication, we can move the variable to the top of the fraction (numerator)
is the same as

(using cross-multiplication)

now we can solve for

How to solve an equation with two of the same variables

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

Distributive property

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

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