Linear Equations and Functions CHAPTER 3 Linear Equations and Functions
Open Sentences in Two Variables SECTION 3-1 Open Sentences in Two Variables
DEFINITIONS Open sentences in two variables– equations and inequalities containing two variables
EXAMPLES 9x + 2y = 15 y = x2 – 4 2x – y ≥ 6
Solution– is a pair of numbers (x, y) called an ordered pair. DEFINITIONS Solution– is a pair of numbers (x, y) called an ordered pair.
DEFINITIONS Solution set– is the set of all solutions satisfying the sentence. Finding the solution is called solving the open sentence.
Solve the equation: 9x + 2y = 15 if the domain of x is {-1,0,1,2} EXAMPLE Solve the equation: 9x + 2y = 15 if the domain of x is {-1,0,1,2}
SOLUTION x (15-9x)/2 y Solution -1 [15-9(-1)]/2 12 (-1,12) [15-9(0)]/2 [15-9(0)]/2 15/2 (0,15/2) 1 [15-9(1)]/2 3 (1,3) 2 [15-9(2)]/2 -3/2 (2,-3/2)
SOLUTION the solution set is {(-1,12), (0, 15/2), (1,3), (2,-3/2)}
EXAMPLE Roberto has $22. He buys some notebooks costing $2 each and some binders costing $5 each. If Roberto spends all $22 how many of each does he buy?
(n and b must be whole numbers) 2n + 5b =22 n = (22-5b)/2 SOLUTION n = number of notebooks b = number of binders (n and b must be whole numbers) 2n + 5b =22 n = (22-5b)/2
If n is odd then 22-5b is odd and n is not a whole number SOLUTION If n is odd then 22-5b is odd and n is not a whole number
SOLUTION b (22-5b)/2 n Solution [22-5(0)]/2 11 (0,11) 2 [22-5(2)]/2 6 [22-5(0)]/2 11 (0,11) 2 [22-5(2)]/2 6 (2,6) 4 [22-5(4)]/2 1 (4,1) [12-5(6)]/2 -4 Impossible
SOLUTION the solution set is {(0,11), (2, 6), (4,1)}
Graphs of Linear Equations in Two Variables SECTION 3-2 Graphs of Linear Equations in Two Variables
COORDINATE PLANE consists of two perpendicular number lines, dividing the plane into four regions called quadrants
COORDINATE PLANE
X-coordinate (abscissa)- the horizontal number line Y-coordinate (ordinate) - the vertical number line ORIGIN - the point where the x-coordinate and y-coordinate cross
(-3, 5), (2,4), (6,0), (0,-3) DEFINITION ORDERED PAIR - a unique assignment of real numbers to a point in the coordinate plane consisting of one x-coordinate and one y-coordinate (-3, 5), (2,4), (6,0), (0,-3)
ONE-TO-ONE CORRESPONDENCE There is exactly one point in the coordinate plane associated with each ordered pair of real numbers.
ONE-TO-ONE CORRESPONDENCE There is exactly one ordered pair of real numbers associated with each point in the coordinate plane.
DEFINITION GRAPH – is the set of all points in the coordinate plane whose coordinates satisfy the open sentence.
The graph of every equation of the form THEOREM The graph of every equation of the form Ax + By = C (A and B not both zero) is a line. Conversely, every line in the coordinate plane is the graph of an equation of this form
is an equation whose graph is a straight line. LINEAR EQUATION is an equation whose graph is a straight line.
SECTION 3-3 The Slope of a Line
SLOPE is the ratio of vertical change to the horizontal change. The variable m is used to represent slope.
FORMULA FOR SLOPE Or m = rise run m = change in y-coordinate change in x-coordinate Or m = rise run
SLOPE OF A LINE m = y2 – y1 x2 – x1
a horizontal line containing the point (a, b) is described by the equation y = b and has slope of 0
VERTICAL LINE a vertical line containing the point (c, d) is described by the equation x = c and has no slope
Find the slope of the line that contains the given points. M(4, -6) and N(-2, 3)
THEOREM The slope of the line Ax + By = C (B ≠ 0) is - A/B
THEOREM Let P(x1,y1) be a point and m a real number. There is one and only one line L through P having slope m. An equation of L is y – y1 = m (x – x1)
Write an equation of a line with the given slope and through a given point m= -2 P(-1, 3)
Finding an Equation of a Line SECTION 3-4 Finding an Equation of a Line
where m is the slope and (x1 ,y1) is a point on the line. POINT-SLOPE FORM y – y1 = m (x – x1) where m is the slope and (x1 ,y1) is a point on the line.
Write an equation of a line with the given slope and passing through a given point in standard form
is the point where the line intersects the y -axis. Y-Intercept is the point where the line intersects the y -axis.
is the point where the line intersects the X-Intercept is the point where the line intersects the x -axis.
where m is the slope and b is the y -intercept SLOPE-INTERCEPT FORM y = mx + b where m is the slope and b is the y -intercept
Write an equation of a line with the given y-intercept and slope m=3 b = 6
L1 and L2 are parallel if and only if m1=m2 THEOREM Let L1 and L2 be two different lines, with slopes m1 and m2 respectively. L1 and L2 are parallel if and only if m1=m2
L1 and L2 are perpendicular if and only if m1m2 = -1 THEOREM and L1 and L2 are perpendicular if and only if m1m2 = -1
Write an equation of a line passing through the given points A(1, -3) B(3,2)
Find the slope of a line parallel to the line containing points M and N.
Find the slope of a line perpendicular to the line containing points M and N.
Write an equation of a line parallel to y=-1/3x+1 containing the point (1,1) m=-1/3
Write an equation of a line perpendicular to y= -1/3x+1 containing the point (1,1) m=-1/3 P(1, 1)
Systems of Linear Equations in Two Variables SECTION 3-5 Systems of Linear Equations in Two Variables
SYSTEM OF EQUATIONS Two linear equations with the same two variable form a system of equations.
The ordered pair that makes both equations true. SOLUTION The ordered pair that makes both equations true.
INTERSECTING LINES The SOLUTION to the system of equations is a point (point of intersection of the two lines).
PARALLEL LINES There is NO SOLUTION to the system of equations (no intersection of the two lines).
COINCIDING LINES The graph of each equation is the same. The lines coincide and any point on the line is a solution.
Systems that have the same solution. EQUIVALENT SYSTEMS Systems that have the same solution.
METHODS FOR SOLVING SYSTEM OF EQUATIONS Graphing Substitution Linear-Combination
SOLVE BY GRAPHING 4x + 2y = 8 3y = -6x + 12
SOLVE BY GRAPHING y = 1/2x + 3 2y = x - 2
SUBSTITUTION A method for solving a system of equations by solving for one variable in terms of the other variable.
3x – y = 6 x + 2y = 2 Solve for y in terms of x. 3x = 6 + y SOLVE BY SUBSTITUTION 3x – y = 6 x + 2y = 2 Solve for y in terms of x. 3x = 6 + y 3x – 6 = y then
Substitute the value of y into the second equation SOLVE BY SUBSTITUTION Substitute the value of y into the second equation x + 2y = 2 x + 2(3x – 6) = 2 x + 6x – 12 = 2 7x = 14 x = 2 now
Substitute the value of x into the first equation SOLVE BY SUBSTITUTION Substitute the value of x into the first equation 3x – y = 6 y = 3x – 6 y = 3(2 – 6) y = 3(-4) y = -12
2x + y = 0 x – 5y = -11 Solve for y in terms of x. y = -2x then SOLVE BY SUBSTITUTION 2x + y = 0 x – 5y = -11 Solve for y in terms of x. y = -2x then
Substitute the value of y into the second equation SOLVE BY SUBSTITUTION Substitute the value of y into the second equation x – 5y = -11 x – 5(-2x) = -11 x+ 10x = -11 11x = -11 x = -1
Substitute the value of x into the first equation SOLVE BY SUBSTITUTION Substitute the value of x into the first equation 2x + y = 0 y = -2x y = -2(-1) y = 2
LINEAR-COMBINATION Another method for solving a system of equations where one of the variables is eliminated by adding or subtracting the two equations.
LINEAR COMBINATION If the coefficients of one of the variables are opposites, add the equations to eliminate one of the variables. If the coefficients of one of the variables are the same, subtract the equations to eliminate one of the variables.
Solve the resulting equation for the remaining variable. LINEAR COMBINATION Solve the resulting equation for the remaining variable.
LINEAR COMBINATION Substitute the value for the variable in one of the original equations and solve for the unknown variable.
Check the solution in both of the original equations. LINEAR COMBINATION Check the solution in both of the original equations.
LINEAR COMBINATION This method combines the multiplication property of equations with the addition/subtraction method.
SOLVE BY LINEAR-COMBINATION 3x – 4y = 10 3y = 2x – 7
3x – 4y = 10 -2x +3y = -7 Multiply equation 1 by 2 SOLUTION 3x – 4y = 10 -2x +3y = -7 Multiply equation 1 by 2 Multiply equation 2 by 3
SOLUTION 6x – 8y = 20 -6x +9y = -21 Add the two equations. y = -1
Substitute the value of y into either equation and solve for SOLUTION Substitute the value of y into either equation and solve for 3x – 4y = 10 3x – 4(-1) = 10 3x + 4 = 10 3x = 6 x = 2
The system of equations has at least one solution. CONSISTENT SYSTEM The system of equations has at least one solution.
INCONSISTENT SYSTEM The system of equations has no solution.
DEPENDENT SYSTEM The graph of each equation is the same. The lines coincide and any point on the line is a solution.
Problem Solving: Using Systems SECTION 3-6 Problem Solving: Using Systems
EXAMPLE If 8 pens and 7 pencils cost $3.37 while 5 pens and 11 pencils cost $3.10, how much does each pen and each pencil cost?
Let x = cost of a pen y = cost of a pencil 8x + 7y = 3.37 SOLUTION Let x = cost of a pen y = cost of a pencil 8x + 7y = 3.37 5x + 11y = 3.10
Solve the system of equations. SOLUTION Solve the system of equations. x = 29 y = 15
EXAMPLE To use a certain computer data base, the charge is $30/hr during the day and $10.50/hr at night. If a research company paid $411 for 28 hr of use, find the number of hours charged at the daytime rate and at the nighttime rate.
Let x = number of hrs at daytime rate SOLUTION Let x = number of hrs at daytime rate y = number of hrs at nighttime rate 30x + 10.50y = 411 x + y = 28
Solve the system of equations. SOLUTION Solve the system of equations. x = 6 y = 22
Linear Inequalities in Two Variables SECTION 3-7 Linear Inequalities in Two Variables
SYSTEM OF INEQUALITIES Linear equations that have the equal sign replaced by one of these symbols <, ≤, ≥, >
SYSTEM OF LINEAR INEQUALITIES The SOLUTION of an inequality in two variables is an ordered pair of numbers that satisfies the inequality.
SYSTEM OF LINEAR INEQUALITIES A system of linear inequalities can be solved by graphing each associated equation and determining the region where the inequality is true.
Graphically its the region on either side of the line. HALF-PLANE Graphically its the region on either side of the line.
is the line separating the half-planes BOUNDARY is the line separating the half-planes
OPEN HALF-PLANE is the region on either side of the boundary line (illustrated by a dashed-line).
is the solution that includes the boundary line. CLOSED HALF-PLANE is the solution that includes the boundary line.
GRAPH of an INEQUALITY is a graph of all the solutions of the inequality and includes a boundary, either a solid line or dashed line and a shaded area.
TEST POINT is a point that does not lie on the boundary, but rather above or below it.
GRAPHING INEQUALITIES x + y ≥ 4 (0,4),(4,0)
Shade the region above a dashed line if y > mx + b.
Shade the region above a solid line if y mx + b.
Shade the region below a dashed line if y < mx + b.
Shade the region below a solid line if y ≤ mx + b.
SOLVE BY GRAPHING THE INEQUALITIES x + 2y < 5 2x – 3y ≤ 1
SOLVE BY GRAPHING THE INEQUALITIES 4x - y 5 8x + 5y ≤ 3
SECTION 3-8 Functions
A picture showing a correspondence between two sets MAPPING DIAGRAM A picture showing a correspondence between two sets
MAPPING – the relationship between the elements of the domain and range
DOMAIN – the set of all possible x-coordinates RANGE – the set of all possible y-coordinates
FUNCTION A correspondence between two sets, D and R, that assigns to each member of D exactly one member of R.
Introduction to Functions Definition – A function f from a set D to a set R is a relation that assigns to each element x in the set D exactly one element y in the set R. The set D is the domain of the function f, and the set R contains the range
Characteristics of a Function Each element in D must be matched with an element in R. Some elements in R may not be matched with any element in D. Two or more elements in D may be matched with the same element in R. An element in D (domain) cannot be match with two different elements in R.
Example A = {1,2,3,4,5,6} and B = {9,10,12,13,15} Is the set of ordered pairs a function? {(1,9), (2,13), (3,15), (4,15), (5,12), (6,10)}
Given f: x→4x – x2 with domain D= {1,2,3,4,5} Find the range of f. EXAMPLE Given f: x→4x – x2 with domain D= {1,2,3,4,5} Find the range of f. f, the function that assigns to x the number 4x – x2
SOLUTION x 4x-x2 (x,y) 1 4(1) – 1 = 3 (1,3) 2 4(2) – 4 = 4 (2,4) 3 4(3) – 9 = 3 (3,3) 4 4(4) – 16 = 0 (4,0) 5 4(5) – 25 = -5 (5,-5)
f(x) denotes the value of f at x FUNCTIONAL NOTATION f(x) denotes the value of f at x
The members of its range. VALUES of a FUNCTION The members of its range.
SECTION 3-9 Linear Functions
Linear Function Is a function f that can be defined by f(x) = mx + b Where x, m and b are real numbers. The graph of f is the graph of y = mx +b, a line with slope m and y -intercept b.
Constant Function If f(x) = mx + b and m = 0, then f(x) = b for all x and its graph is a horizontal line y = b
Rate of Change m Rate of Change m = change in f(x) Change in x
Find equations of the linear function f using the given information. EXAMPLE Find equations of the linear function f using the given information. f(4) = 1 and f(8) = 7
SOLUTION m = f(8) – f(4) 8 – 4 m = 3/2
SECTION 3-10 Relations
RELATION Is any set of ordered pairs. The set of first coordinates in the ordered pairs is the domain of the relation, and
and the set of second coordinates is the range. RELATION and the set of second coordinates is the range.
FUNCTION is a relation in which different ordered pairs have different first coordinates.
VERTICAL LINE TEST a relation is a function if and only if no vertical line intersects its graph more than once.
Determine if Relation is a Function {2,1),(1,-2), (1,2)} {(x,y): x + y = 3}
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