Earlier in this chapter we have expressed linear equations using the standard form Ax + By = C and also y= mx +b. Now we're going to focus on the slope-intercept form y = mx + b. Show In the slope-intercept form you use the slope of the line and the y-intercept to express the linear function. $$y=mx+b$$ Where m is the slope and b is the y-intercept. Example Graph the equation $$y-2x=1$$ rewrite in slope-intercept form $$y=2x+1$$ Identify the slope and the y-intercept m = 2 and b = 1 Plot the point corresponding to the y-intercept, (0,1)  The m-value, the slope, tells us that for each step to the right on the x-axis we move 2 steps upwards on the y-axis (since m = 2) And once you have your second point you can just draw a line through the two points and extend it in both directions. You can check to see that the line you've drawn is the correct one by substituting the coordinates of the second point into the original equation. If the equation holds true than the second point is correct. Our second point = (1, 3) $$y-2x=1$$ $$3-2\cdot 1=3-2=1$$ Our second point is a solution to the equation i.e. the line we drew is correct. A line that passes through the origin has a y-intersect of zero, b = 0, and represents a direct variation. $$y=mx$$ In a direct variation the nonzero number m is called the constant of variation. You can name a function, f by using the function notion $$f\left ( x \right )=mx+b$$ f(x) is another name for y and is read as "the value of f at x" or "f of x". You can use other letters than f to name functions. A group of functions that have similar characteristics are called a family of functions. All functions that can be written on the form f(x) = mx + b belong to the family of linear functions. The most basic function in a family of functions is called the parent function. The parent function of all linear functions is $$f\left ( x \right )=x$$ Video lessonGraph y = 3x - 2 In Maths, an intercept is a point on the y-axis, through which the slope of the line passes. It is the y-coordinate of a point where a straight line or a curve intersects the y-axis. This is represented when we write the equation for a line, y = mx+c, where m is slope and c is the y-intercept. There are basically two intercepts, x-intercept and y-intercept. The point where the line crosses the x-axis is the x-intercept and the point where the line crosses the y-axis is the y-intercept. In this article, you will learn what is the intercept, how to find the intercept for a given line, graphing intercepts along with solved examples. Definition of InterceptThe point where the line or curve crosses the axis of the graph is called intercept. If a point crosses the x-axis, then it is called the x-intercept. If a point crosses the y-axis, then it is called the y-intercept. The meaning of intercept of a line is the point at which it intersects either the x-axis or y-axis. If the axis is not specified, usually the y-axis is considered. It is normally denoted by the letter ‘b’. Except that line is accurately vertical, it will constantly cross the y-axis somewhere, even if it is way off the top or bottom of the chart. Also read: Equation of plane in intercept form Intercept FormulaThe equation of the line, which intersects the y-axis at a point is given by: y = mx + b Hence, the formula for the y-intercept of a line is given by: b = y – mx Where, b is the intercept, m is the slope of the line and y and x indicate the points on the y-axis and x-axis respectively. Now, another way of writing the equation of the line, considering a line is intersecting the x-axis and y-axis at point a and b respectively. How to Find X and Y Intercepts?Consider a straight line equation Ax + By = C. Divide the equation by C, (Ax/C) + (By/C) = C/C [x/(C/A)] + [y/(C/B)] = 1Comparing this equation with the equation of a line in intercept form, (x/a) + (y/b) = 1, We get, x-intercept = a = C/A y-intercept = b = B/C Alternatively, To find the x-intercept, substitute y = 0 and solve for x. i.e. Ax + B(0) = C Ax = C x = C/A To find the y-intercept, substitute x =0 and solve for y. i.e. A(0) + By = C By = C y = C/B Go through the example given below to understand this concept in a better way. Example: Let us assume the straight-line equation 5x +2y =10 To find x-intercept: Substitute y=0 in the given equation 5x + 2(0) = 10 5x =10 x =2 To find y-intercept Substitute x =0 in the given equation 5(0) + 2y =10 2y = 10 y = 5 Therefore, x -intercept is (2, 0) y -intercept is (0, 5) Two Point FormThe formula of the line formed by the two points is given by: y-y1/y2-y1 = x-x1/x2-x1 Say, P(a, 0) = (x1, y1) and Q(0, b) = (x2, y2) are the two points of the line which cuts the x-axis and y-axis, relative to the origin(0,0). Then the formula becomes: => y – 0 / b – 0 = x – a/ 0 – a => y/b = x/-a – a/-a => x/a + y/b = 1 Hence, proved. Learn more about the two-point form here. Slope Intercept FormThe equation of the line making an intercept c on the y-axis and having slope m is given by: y = mx + c Note: The value of c could be positive or negative since the intercept is drawn on the positive or negative side of the y-axis, respectively. Also, check: Slope intercept form Intercept GraphThe intercepts are the points on a graph at which the graph crosses the two axes (x-axis and y-axis). The point where the graph crosses the x-axis is called the x-coordinate and the point where the graph crosses the y-axis is called the y-coordinate. In the above intercept graph, where a line L makes x-intercept a and y-intercept b on the axes. Thus, the equation of the line making intercepts a and b on the x-and y-axis, respectively, is: x/a + y/b = 1 Solved ExamplesExample 1: Let two intercepts P(2,0) and Q(0,3) intersect the x-axis and y-axis, respectively. Find the equation of the line. Solution: Given, two intercepts P(2,0) and Q(0,3) intersect the x-axis and y-axis. From the equation of the line we know, x/a + y/b = 1 ……….. (1) Here, a = 2 and b = 3 Therefore, putting the values of intercepts a and b, in equation 1, we get: =>x/2 + y/3 = 1 => 3x + 2y = 6 => 3x + 2y – 6 = 0, Therefore, the equation of the line is 3x + 2y – 6 = 0. Example 2: Find the equation of the line, which makes intercepts –3 and 2 on the x- and y-axes respectively. Solution: Given, a = –3 and b = 2. By intercept form, we know that; x/a + y/b = 1 x/-3 + y/2 = 1 Or 2x – 3y + 6 = 0. Hence, this is the required equation. Example 3: A line passes through P (1, 2) such that its intercept between the axes is bisected at P. What is the equation of the line? Solution: The equation of a line making intercepts a and b with x-axis and y-axis, respectively, is given by: x/a + y/b = 1 1 = (a+0)/2 ⇒ a = 2 2 = (0 + b)/2 ⇒ b = 4 Therefore, the required equation of line is; x/2 + y/4 = 1 ⇒ 2x + y – 4 = 0 Practice Problems
Stay tuned with BYJU’S – The Learning App and download the app to explore more videos. An intercept is a point where the straight line or a curve intersects the y-axis in a plane. It is also said to be a y-intercept. The formula for y-intercept is given by: b = y – mx Where b is the y-intercept and m is the slope of the line The equation of the line, when a line is intersecting the x-axis and y-axis at point a and b respectively is given by: If a line intersects the y-axis at a point, the value of the x-coordinate will be equal to zero. |
What are the slope and the y-intercept of the linear function that is represented by the equation ?
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