The answer depends on what relationship - if any - exists between the points in the table. There need not be any relationship.
There are 3 forms to write the equation of a line point slope y-y1=m(x-x1) for this form you need one set of points and you plug them into x1 and y1 and you need the slope which you plug into m
The formula for a line is: Y = mX + b
Points: (20, 18) and (35, 6) Slope: -4/5 Equation: y = -4/5x+34
17 and 2 :)
if p represents your positive number, and n represents all of your negative numbers, then: |∑n| < p
x=y
Write the equation of the line that passes through the points (3, -5) and (-4, -5)
n-12+4n++2_3n
160 x 0.1 = 16
There are 3 forms to write the equation of a line point slope y-y1=m(x-x1) for this form you need one set of points and you plug them into x1 and y1 and you need the slope which you plug into m
Actually, two separate points are enough to determine the line.
Points: (-3, -4) and (6, -1) Slope: 1/3 Equation: 3y = x-9
The formula for a line is: Y = mX + b
Points: (20, 18) and (35, 6) Slope: -4/5 Equation: y = -4/5x+34
Without an equality sign the given expression can't be considered to be an equation
A linear equation or first-degree equation is an equation such as 3x - y = 1 in which no variable has no exponent other than 1. To solve this equation we first write the equation in slope-intercept form as y = 3x - 1 (this is the same thing as we write: f(x) = 3x - 1, because f(x) = y). Then prepare a table of values that includes three points whose coordinates satisfy the equation of the line: We give the values for x, substitute the x-values into the equation of the line to obtain the corresponding y-values. For example, for x = -1; y = 3(-1) - 1 = -4 Solution is (-1, -4), the first point for x = 0 ; y = 3(0) - 1 = -1 Solution is (0, -1), the second point for x = 1 ; y = 3(1) - 1 = 2 Solution is (1, 2), the third point Plot the three solution points in the coordinate plane, then connect these points with a straight line. If it is not possible to draw a line that contains all three points, then you made a mistake either in calculating the coordinates of at least one of the points or in plotting them
17 and 2 :)