Ax+By=C
The equation Ax + By = C represents a linear equation in two variables x and y
The equation Ax + By = C represents a linear equation in two variables x and y. In this equation, A, B, and C are constants. A and B are the coefficients of x and y respectively, and C represents the constant term.
To better understand the equation, let’s break it down:
– The coefficient A represents the slope of the line. It determines how much the value of y changes when the value of x changes by 1. If A is positive, the line has a positive slope, meaning it rises from left to right. If A is negative, the line has a negative slope, meaning it falls from left to right. If A is zero, the line is horizontal.
– The coefficient B also affects the slope of the line. It determines how much the value of x changes when the value of y changes by 1. If B is positive, the line falls from top to bottom. If B is negative, the line rises from top to bottom. If B is zero, the line is vertical.
– The constant C represents the y-intercept, which is the point where the line intersects the y-axis. It is the value of y when x is equal to zero.
To graph the equation Ax + By = C, you can follow these steps:
1. Calculate the slope of the line by rearranging the equation in the form y = mx + b. You can achieve this by isolating y:
By = C – Ax
y = (C – Ax) / B
Now you have the equation in slope-intercept form.
2. Plot the y-intercept by locating the point (0, y) on the y-axis, where y is the value of the constant C.
3. Use the slope (m) found in step 1 to find other points on the line. From the y-intercept, move right or left by 1 unit (according to the value of A) and move up or down by m units (according to the value of B) to find another point. You can repeat this process to find more points.
4. Once you have at least two points, draw a straight line through the points to represent the graph of the equation Ax + By = C.
Remember that this is a basic explanation of the equation and graphing process. There are many variations and additional concepts related to linear equations that you may encounter in more advanced math topics.
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