Warm-up 1.) Write 25% as a fraction in lowest terms and as a decimal. 2.) Make an input-output table for the function , use the values -2, -1, 0, 1, 2, 3 for x. 3.)Evaluate the expression when x = 4 and y = -2 ¼ and 0.25 X Y -2 11 -1 9 7 1 5 2 3 “make a t-chart”!!
Solve for y 1.) 2x – y = -3 2.) 4x + y = 10 3.) y – x = 3 4.) -2x + 2y = 6 5.) 3x + 3y = 9 6.) 2x – 2y = 8 -2x -2x -4x -4x -y = -2x - 3 y = -4x +10 y = 2x + 3 + 2x + 2x +x +x 2y = 2x + 6 Divide by 2 y = x + 3 y = x + 3 -3x -3x -2x -2x Divide by -2 -2y = -2x + 8 3y = -3x + 9 Divide by 3 y = x - 4 y = -x + 3
Section 1 The Rectangular Coordinate System Chapter 3 Section 1 The Rectangular Coordinate System
The Coordinate Plane -5 5
The coordinate plane is divided by two number lines The coordinate plane is divided by two number lines. We have vertical and horizontal number lines. -5 5 10 -10
The two number lines have special names. -5 5 10 -10 The two number lines have special names. The horizontal number line is called the x-axis. The vertical number line is called the y-axis.
The coordinate plane is filled with points . . .
. . . infinitely many points. And somewhere among all those points is the point we call the origin.
The origin is the point where the two number lines meet. -5 5 10 -10
Coordinates are always written in parentheses, with the x-value first. -5 5 10 -10 Coordinates are always written in parentheses, with the x-value first. Coordinates written in parentheses are called an ordered pair.
Consider the point which has coordinates, (4, -2). -5 5 10 -10 Consider the point which has coordinates, (4, -2). So the 4 in (4, -2) says we need to move 4 units to the right. The first number tells you how far to move along the x-axis. Remember to start at the origin!
The second number tells you how far to move up or down. -5 5 10 -10 The second number tells you how far to move up or down. The –2 in (4, -2) tells you to move down two units.
The two number lines divide the plane into four regions. -5 5 10 -10 In Quadrant II, x-values are negative, while y-values are positive. In Quadrant I, all values are positive. The two number lines divide the plane into four regions. We call the regions quadrants. Quadrants are labeled with Roman Numerals. In Quadrant IV, x-values are positive and y-values are negative. In Quadrant III, x- and y-values are both negative.
Give the coordinates of each point:
Which quadrant is each point in? From the origin, move to the right 8 units, then down 7 units. (8,–7) (4,0) (–4,–5) (0,–9) (7,12) From the origin, move to the right 4 units, then stop (Stay on the x-axis.). From the origin, move to the left 4 units, then down 5 units. From the origin, don’t move to the right or left (stay on the y-axis), then move down 9 units. From the origin, move to the right 7 units, then up 12 units.
Plotting Points in a Rectangular Coordinate System Quadrant 11 Quadrant 1 Points graphed in a rectangular coordinate system are defined by two numbers as an ordered pair (x , y) (+, +) (-, +) (-, -) (+, -) Quadrant 111 Quadrant 1v
Plotting points in a Rectangular Coordinate System Plot the points a). (4, 5) b). (-4, -5) c). (-1, 3) d). (3, -1) e). (-2, 0) f). (0,0)
Distance Formula Used to find the distance between two points
Example Find the distance between A(4,8) and B(1,12) A (4, 8) B (1, 12)
YOU TRY!! Find the distance between: A. (2, 7) and (11, 9) B. (-5, 8) and (2, - 4)
Midpoint Formula Used to find the center of a line segment
Example Find the midpoint between A(4,8) and B(1,12) A (4, 8) B (1, 12)
YOU TRY!! Find the midpoint between: A) (2, 7) and (14, 9) B) (-5, 8) and (2, - 4)
Constant Rate of Change The slope of a nonvertical line is the ratio of the vertical change (rise) to the horizontal change (run) between any two points on the line. Find the slope between (2, 4) and (4, 8).
Rate of Change The rate of change is the ratio of the change of one quantity to a change in another quantity. Example: - The table shows the amount of water evaporating from a swimming pool on a hot day. Find the rate of change in gallons with respect to time.
Example Where is the greatest rate of increase? How about the lowest rate of increase?
Rate of Change Where is the greatest rate of change on the graph? What is the value?
Average Rate of Change If you travel 200 miles in 4 hours, what is your average speed? 50 mph Does this mean that you necessarily travel 50 mph for the whole trip? No! The rate can change so we call it your AVERAGE speed. In the same way, Because the rate of change is not constant for some functions, we can’t just call it rate of change. So we call it AVERAGE rate of change.
Let’s look at a quadratic function Y = 5x2 First make an x/y table Find the change in y for each change in x. (It will change!) X Y -3 -2 -1 1 X Y -3 -2 -1 1 5(-3)2 =5(9) =45 5(-2)2 =5(4) =20 5(-1)2 =5(1) =4 5(0)2 =5(0) =0 5(1)2 =5(1) =5
You try! a) Find the average rate of change between x = -2 and x= -1 Y = 3x2 a) Find the average rate of change between x = -2 and x= -1 b) Find the average rate of change between x = 0 and x = 1
Average Rate of Change The average range of change between any two points (x1,f(x1)) and (x2,f(x2)) is the slope of the line through the 2 points.
Example 1 Find the average rate of change of f(x) = 2x2 – 3 when x1= 2 and x2 = 4.
Example 2 Find the average rate of change of f(x) = x3 – 3x when x1= -2 and x2 = 0.