mth 100 cbi the rectangular coordinate system. objectives 1.plot ordered pairs in the rectangular...
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Objective 1TRANSCRIPT
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MTH 100 CBI
The Rectangular Coordinate System
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Objectives
1. Plot Ordered Pairs in the Rectangular Coordinate System.
2. Determine if an Ordered Pair is a Solution to an Equation.
3. Find Unknown Coordinates.4. Graph Equations by Plotting Points.5. Find x- and y-intercepts.
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Objective 1
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Objective 2
• A linear equation (in two variables) in standard form is written as Ax + By = C.
• A solution to a linear equation (in two variables) is an ordered pair (x, y) that satisfies the equation (makes it true).
• Example: Determine if (-2, 6) is a solution to4x + 3y = 10.
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Objectives 3 and 4• The graph of every linear equation is a straight
line (the line may slant upwards, stant downwards, be horizontal, or be vertical).
• One strategy for graphing a linear equation is to create a table of values.
• In a table of values, one half of the ordered pair (either x or y) is given, and the other half is solved for in the equation.
• Once the ordered pairs have been completed, their plots should be able to be connected with a straight line.
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Objectives 3 and 4 Example
• Using the equation 4x + 3y = 10, complete the following ordered pairs and sketch the graph:
1.( ____, -2)2.( 7, ____ )3.( ____, 0)4.( 0, ____ )
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Objective 5
• Now, look back at parts 3 and 4 of the previous example. Notice that those two points are located on the x- and y-axis, respectively.
• A point that lies on the x-axis is called the x-intercept. To find an x-intercept, set y = 0 and solve for x.
• A point that lies on the y-axis is called the y-intercept. To find a y-intercept, set x = 0 and solve for y.
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Objective 5 Examples
• Find the x-intercept and y-intercept for each of the following equations:
1.2x – y = -82.y = -3x