ALGEBRA II – SUMMER PACKET



Name______________________________ Algebra II – A1 Review Packet 2018Since this material is designed as review, you are responsible for completing this packet on your own. An assessment will be given to assess the student’s knowledge of the covered topics within the first two weeks of the new school year. Be sure to SHOW ALL WORK . NO CALCULATORS UNLESS MARKED!304800-11430000I. Order of Operations (PEMDAS)Parenthesis and other grouping symbols.Exponential expressions.Multiplication & Division (Whichever comes first)Addition & Subtraction.Tutorial: each numerical expression.6 + 2 (8 ) – 12 + 9 32) 25 – 4(23 + 5 (2) – 3)4) II. Evaluating Algebraic ExpressionsTo evaluate an algebraic expression:Substitute the given value(s) of the variable(s).Use order of operations to find the value of the resulting numerical expression.Tutorials:) 2) 12a – 4a2 + 7a3 if a = -33) 4) 2(3)x if x = 35) if x = 3 and y = 46) 7) if P = 650, r = 6%, n = 2, t = 15 (CALC OK) 8) If k n = k3 – 3n, evaluate 7 5III. Simplifying RadicalsAn expression under a radical sign is in simplest radical form when:there is no integer under the radical sign with a perfect square factor,there are no fractions under the radical sign,3) there are no radicals in the denominatorTutorials: the following in simplest radical form. NO CALC1) 2) 3) 4) 5) 6) 7) 8) Properties of ExponentsPropertyExampleProduct of Powersam an = am + nx4 x2 =Power of a Power(am)n = amn(x4)2 =Power of a Product(ab)m = ambm(2x)3 =Negative Powera-n = (a0)x-3 =Zero Powera0 = 1 (a0) 40 = Quotient of Powers = am – n (a0) =Power of Quotient= (b0) =Tutorials: each expression. Answers should be written using positive exponents.1)g5 g11 __________2)(b6)3 __________3)4w-7 __________4) __________5)(3x7)(-5x3) __________6)(-4a5b0c)2 __________7) __________8) __________IV. Solving Linear EquationsTo solve linear equations, first simplify both sides of the equation. If the equation contains fractions, multiply the equation by the LCD to clear the equation of fractions. Use the addition and subtraction properties of equality to get variables on one side and constants on the other side of the equal sign. Use the multiplication and division properties of equality to solve for the variable. Express all answers as fractions in lowest terms.Tutorials: Solving Linear Equations: : Solve for the indicated variable: 1) 3(n + 1) + 4(n – 2) = 7n – 52) 2[x + 3(x – 1)] = 18 3) 4) 5) 5 + 2(k + 4) = 5(k - 3) + 106) 2x(x – 3) = 2x27) 8) V. Operations With PolynomialsTo add or subtract polynomials, just combine like terms. To multiply polynomials, multiply the numerical coefficients and apply the rules for exponents.Tutorials:Polynomials (adding & subtracting): , Polynomials (multiplying): , Examples: a) (x2 + 3x - 2) - (3x2 - x + 5)x2 + 3x - 2 - 3x2 + x -5-2x2 + 4x - 7c) 4(5x2 + 3x - 4) + 3(-2x2 - 2x + 3)20x2 + 12x - 16 - 6x2 - 6x + 914x2 + 6x - 7 b) 3x(2x + 5)2 3x(4x2 + 20x + 25) 12x3 + 60x2 + 75x d) (4x - 5)(3x + 7) 12x2 + 28x - 15x - 35 12x2 + 13x - 35Perform the indicated operations and simplify:1) (7x2 + 4x - 3) - (-5x2 - 3x + 2)2) (7x - 3)(3x + 7)3) (4x + 5)(5x + 4)4) (5n + 3) (2n2 + 8n + 8)5) (-4 + 5x2 ) – 2(3x2 + 8x + 4)6) -2x(5x + 11) – (x+2)(x – 2)7) 8) (5x – 6)29) 10) VI. Factoring Polynomials Examples: Factoring out the GCF Difference of Squares Perfect Square Trinomial a) 6x2 + 21x b) x2 - 64 c) x2 - 10x + 25 3x(2x + 7) (x - 8)(x + 8) (x – 5)2 Trinomial d) 3x2 + 7x + 2 Trinomial e) 2x2 - 13x + 15 Trinomialf) 6x2 + x – 1 (3x + l)(x + 2) (2x - 3)(x - 5) (3x - 1)(2x + 1)Tutorials:Factoring Trinomials (skip substitution method): Polynomials (video): a Trinomial: Completely. 1) 16y2 + 8y2) 18x2 - 12x3) 6m2 - 60m + 104) 6y2 - 13y – 55) 20x2 + 31x - 76) 12x2 + 23x + 107) x2 - 2x - 638) 8x2 - 6x - 99) x2 – 12110) 11) VII. Linear Equations in Two Variables Examples: a) Find the slope of the line passing through the points (-1, 2) and (3, 5).b) Graph y = 2/3 x - 4 with slope-intercept method.Reminder: y = mx + b is slope-intercept form where m =. slope and b = y-intercept.5105400-825500 Therefore, slope is 2/3 and the y-intercept is – 4. 220980015240000Graph accordingly. 388620018351500c) Graph 3x - 2y - 8 = 0 with slope-intercept method.Put in Slope-Intercept form: y = -3/2 x + 4m = 3/2b = -4d) Write the equation of the line with a slope of 3 and passing through the point (2, -1) y = mx + b -1 = 3(2) + b 160020011049000-7 = b Equation: y = 3x – 7 Tutorials:Using the slope and y-intercept to graph lines: equations (slope-intercept form): the slope of the line passing through each pair of points: (-3, -4) (-4, 6) (-4, -6) (-4, -8)(-5, 3) (-11, 3)Write an equation, in slope-intercept form using the given information.4) (5, 4) m = 5) (-2, 4) m = -3 6) (-6, -3) (-2, -5) VIII. Solving Systems of Equations Solve for x and y:x = 2y + 5 3x + 7y = 2Using substitution method:3(2y + 5) + 7y = 26y + 15 + 7y = 213y = -13y = -1x = 2(-1) + 5x=3Solution: (3, -1)Solve for x and y:3x + 5y = 1 2x + 3y = 0Using linear combination (addition/ subtraction) method:3(3x + 5y = 1)-5(2x + 3y = 0)9x + 15y = 3-l0x - 15y = 0-1x = 3x = -32(-3) + 3y = 0y=2Solution: (-3, 2)Solve each system of equations by either the substitution method or the linear combination (addition/ subtraction) method. Write your answer as an ordered pair. Tutorials:Solve systems of equations (videos): of Linear Equations: ) y = 2x + 4 2) 2x + 3y = 6 -3x + y = - 9 -3x + 2y = 17 3) x – 2y = 5 4) 3x + 7y = -1 3x – 5y = 8 6x + 7y = 0 IX. Solving One-Variable Inequalities )?? Solve?? 3(x - 5) < 4 - (2 - 2x).2) Solve 5x - 12 ≥? 7x + 4.407098563563500510921068389500513778558801000407098563563500 3x - 15 < 4 - 2 + 2x-2x - 12? ≥?? 4 3x - 15 < 2 + 2x-2x? ≥? 16 x - 15 < 2x ≤ -8? is the solution.????????????? x < 17 is the solution.?????????????????????? 1318260172720001283970263525003562352336800013277851860550035623523368000Note: Dividing both sides by -2 changed the direction of the inequality.?Interval notation: INTERVAL NOTATION.Recall - ( ) not included, therefore, use when your inequality contains < or > [ ] values are included, therefore, use when your inequality contains less than or equal to or greater than or equal to.Negative and positive infinity would use ( ).Practice: Solve and Graph each inequality. 1. -2x + 3 < 92. (2/3)x – 9 ≤ 2x + 6Compound Inequalities! SANDWHICHES OR OARS? Solve and graph. Then write the solution in 3. 4. ???????????????????IX. Graphing Two-Variable Inequalities A LINEAR INEQUALITYTo graph a linear inequality in two variables, follow these steps:Step 1: Graph the boundary line for the inequality. Use a _dashed_ line for < or > and a _solid_ line for or .Step 2: Test a point not on the boundary line to determine whether it is a solution of the inequality. If it is a solution, shade the side containing the point. If it is not a solution, shade the other side.Example 1Graph a linear inequality with one variableGraph y < 1 in a coordinate plane.895357556500 Solution Graph the boundary line y = 1. Use a _dashed_ line because the inequality symbol is <. Test the point (0, 0). Because (0, 0) _is not_ a solution of the inequality, shade the half-plane that _does not_ contain (0, 0).8953528638500Graph 3x 2y < 6 in a coordinate plane. Solution Graph the boundary line 3x 2y = 6. Use a _dashed_ line because the inequality symbol is <. Test the point (0, 0). Because (0, 0) _is not_ a solution of the inequality, shade the half-plane that _does not_ contain (0, 0).Practice: Graph each inequality. y x + 22. 9x + 3y > 9 3. 5x - 2y > -1221183602413000-205740241300043662602413000X. Fraction Operations1. If lies between and , what are all the possible values of n if n is a whole number? 2. The product of any fraction and it’s reciprocal is always ________. 3. Add the following fractions:a). + =b). 1 + 1 =c). 2 + 1 =4. Subtract the following fractions:a). - =b). 3 - 1 =c). 3 - 15. Multiply the following fractions: a). 5 X 3 =b). X =c). 3 X 1 =6. Divide the following fractions: a). 5 =b). c). 7. Use the order of operations to answer each of the following: a). ( 2 - ) ÷ ()2 b). ()2 - ()2 c). X [()2 - ] ................
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