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Product Rule for Exponents
Percents
Decimal Numbers and Fractions
The Slope of a Line
Adding and Subtracting Square Roots
Factoring the Difference of Two Squares
Linear Systems of Equations with Infinitely Many Solutions
Axis of Symmetry and Vertices
Types of Linear Equations
Sum of Squares
Non
Subtract Fractions with Unlike Denominators
Solving equations
Solving Exponential Equations
Multiplying by 715
Adding and Subtracting Functions
Negative and Fractional Powers
Graphing Linear Equations in Two Variables
Solving Equations That Contain Rational Expressions
Dividing Polynomials
Polynomials in Several Variables
Polynomials
Multiplying Polynomials
Adding and Subtracting Fractions
Solving Absolute Value Inequalities
Simplifying Complex Fractions
Evaluating Rational Functions
Product Rule for Radicals
Domain and Range of a Function
Solving Linear Equations
Dividing Whole Numbers by Fractions
Reducing Rational Expressions to Lowest Terms
Dividing Polynomials
Factoring by Substitution
Dividing a Polynomial by a Monomial
Linear Inequalities
Adding and Subtracting Complex Numbers
What the Vertex Form of a Quadratic can tell you about the graph
Finding x
Adding and Subtracting Fractions with Like Denominators
Adding and Subtracting Fractions
Solving Equations
Graphing Linear Equations
Factoring
Greatest Common Factors
Exponential Functions
Methods for Solving Quadratic Equations
Factoring Trinomials with Leading Coefficient Not 1
Properties of Natural Logs
Steps for Solving Linear Equations
Multiplying Binomials
Factoring Trinomials
Adding and Subtracting Mixed Numbers with Different Denominators
Simplifying Complex Fractions
Sum or Difference of two Cubes
Multiplying by 858
Polynomials
Graphing Quadratic Equations
Rational Expressions
Graphing Vertical Lines
Dividing Fractions
Pascal
Multiplying Numers
Multiplying Two Numbers Close to but greater than 100
Factoring Trinomials
Equivalent Fractions
Finding the Least Common Multiple
Factoring Rules
Laws of Exponents
Multiplying Polynomials
Dividing Rational Expressions
Evaluating Polynomial Functions
Equations Involving Rational Exponents
Adding and Subtracting Fractions
Factoring Polynomials by Finding the Greatest Common Factor
Rules for Integral Exponents
Rationalizing the Denominator
Ratios and Rates
Factoring Trinomials
Multiplying Polynomials
Point-Slope Form of a Line
Multiplying Decimals
Solving Right Triangles
Solving Equations with One Radical Term
Adding and Subtracting Mixed Numbers
Adding and Subtracting Polynomials
Division Property of Square and Cube Roots
Inverse Functions
Factoring Trinomials
Writing Percents as Fractions
Solving Equations with One Radical Term
Polynomials
Graphing Systems of Inequalities
Multiplying and Dividing Monomials
Conjugates
Roots - Radicals 2
Solving Linear Systems of Equations
Multiplying and Factoring
Solving Equations with Rational Expressions

Solving equations

Solving polynomial equations by factoring:

Solve:

3X = 48X Write the equation in standard form (zero on the right side).

3X - 48X = 0 Take out the common factor and

3X(X - 16) = 0 collect the remaining factor.

3X(X - 4)(X + 4) = 0 Factor completely.

3X = 0 X - 4 = 0 X + 4 = 0 Set each factor equal to zero.

X = 0 X = 4 X = -4 Solve for X.

Solve:

X - 3X +2 = 0 Factor the left side of the equation as the product of 2 second-degree polynomials.

(X - 1)(X - 2) = 0 Partially factored

(X - 1)(X + 1)(X- 2) = 0 Completely factored

X - 1 = 0 X + 1 = 0 X - 2 = 0 Set each factor equal to zero.

X = 1 X = -1 X= 2 Solve for X.

Solve:

X - 2X - 3X = 0

X(X - 2X - 3) = 0 Take out the common factor.

X(X + 1)(X - 3) = 0 Factor completely.

X = 0 X + 1 = 0 X - 3 = 0 Set each factor equal to zero.

X = 0 X = -1 X = 3 Solve for X.

Solving equations involving rational exponents:

The first step is to isolate the rational expression. Second, determine the rational exponent and raise both sides of the equation to the reciprocal exponent. Simplify and check your answers.

Example:

4X- 8 = 0

4X = 8 Add 8 to both sides of the equation.

X = 2 Divide both sides by 4.

(X)= (2) Raise both sides to the 2/3 power(reciprocal power).

X = 2 OR

Check:

4X- 8 = 0

4(2)- 8 = 0 Replace X by 2

4(2) - 8 = 0 Simplify

8 - 8 = 0

0 = 0 The statement is true; therefore, the solution checks.

Solving Radical Equations:

The basic approach to solving radical equations is to get rid of the radical equation. Get rid of the square root by squaring each side of the equation. Get rid of the cube root by cubing each side of the equation, etc.. When changing radical equations and those equations involving rational exponents we often get extraneous solutions (solutions that do not fit the original equation). Therefore, a check of each tentative solution is required.

Example:

Solving Equations involving fractions:

To solve an equation involving fractions, multiply both sides of the equation by the least common denominator of each term in the equation. This procedure will clear the equation of fractions. Solve the following equations that contain fractions and check the tentative solutions:

Example:

multiply each term of the equation by the common denominator x(x+1)

Solving equations involving absolute values:

To solve an equation involving an absolute value, consider the fact that the expression inside the absolute value can be positive or negative. This consideration results in two separate equations, each of which must be solved.

Example:

Both x = 5 and x = -1 are solutions.