Example Problemįind the slope of a straight line passing through the points (-2,-1) and (4,5).įor this example, we will choose (-2,-1) to be point number one, and (4,5) to be point number two, which means. To solve the slope formula, choose any two points on the straight line and designate one of them to be point #1 and the other to be point #2 (regardless of which point you choose for which designation you will still get the same answer).įrom there you simply substitute the values into the slope formula to solve for m (slope). The value of the expression for specific values of x.The formula for calculating the slope of a straight line from any two points on the line is as follows: Slope Formula m = Y 2 - Y 1 X 2 - X 1 Used to name an algebraic expression in the variable x, can also be used to denote Pair that is paired with a specified first component. Sometimes, we use a special notation to name the second component of an ordered In this form, we obtain values of y for given values of x as follows: Now, dividing each member by 2, we obtain Solve 2y - 3x = 4 explicitly for y in terms of x and obtain solutions for x = 0, Equal quantities are multiplied or divided by the same nonzero quantity.The same quantity is added to or subtracted from equal quantities.Where we solved first-degree equations in one variable. Since for point (x 1, y 1) we have y 1 m x 1 + b, the y-intercept b can be calculated by: b y 1 - m x 1. Let say points are: (a,b) and (g,d) General equation of line is y mx. What is the formula to calculate slope intercept form The slope m of the line through any two points (x 1, y 1) and (x 2, y 2) is given by: The y-intercept b of the line is the value of y at the point where the line crosses the y axis. In general, we can write equivalentĮquations in two variables by using the properties we introduced in Chapter 3, Im considering that you are asking how to find equation of line with given two points. Of Equation (1), in that way getting y by itself. We obtained Equation (2) by adding the same quantity, -2x, to each member We get the same pairings that we obtained using Equation (1) It is often easier to obtain solutions if equations are first expressed in such formīecause the dependent variable is expressed explicitly in terms of the independent In Equation (2), where y is by itself, we say that y is expressed explicitly in terms We can add -2x to both members of 2x + y = 4 to get The three pairings can now be displayed as the three ordered pairs Replacements for y are second components and hence y is the dependent variable.įor example, we can obtain pairings for equationīy substituting a particular value of one variable into Equation (1) and solving forįind the missing component so that the ordered pair is a solution to Ments for x are first components and hence x is the independent variable and If the variables x and y are used in an equation, it is understood that replace. It is convenient to speak of the variable associated with theįirst component of an ordered pair as the independent variable and the variableĪssociated with the second component of an ordered pair as the dependent variable. ![]() ![]() For example, the point X11 Y3 would be written. Of the variables, the value for the other variable is determined and thereforeĭependent on the first. Point values are written inside parentheses, with the X value written first, then a comma and then the Y value. In any particular equation involving two variables, when we assign a value to one Such pairings are sometimes shown in one of the following tabular forms. Some ordered pairs for t equal to 0, 1, 2, 3, 4, and 5 are With this agreement, solutions of theĮquation d - 40t are ordered pairs (t, d) whose components satisfy the equation. Second numbers in the pairs as components. We call such pairs of numbers ordered pairs, and we refer to the first and ![]() Order in which the first number refers to time and the second number refers toĭistance, we can abbreviate the above solutions as (1, 40), (2, 80), (3, 120), and If we agree to refer to the paired numbers in a specified The pair of numbers 1 and 40, considered together, is called a solution of theĮquation d = 40r because when we substitute 1 for t and 40 for d in the equation, The equation d = 40f pairs a distance d for each time t. ![]() In this chapter, we will deal with tabular and graphical representations. We have already used word sentences and equations to describe such relationships 4.Ě graph showing the relationship between time and distance.The distance traveled in miles is equal to forty times the number of hours traveled. In a certain length of time by a car moving at a constant speed of 40 miles per hour. As an example, let us consider the distance traveled The language of mathematics is particularly effective in representing relationshipsīetween two or more variables.
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