0
What else can I help you with?
Find the point slope equations of the line using the point 7 4 and slope of?
y-4=3/2(x-7)
How can you tell if two equations are parallel?
if they have the same slope If two linear equations are inconsistent - that is, have no solution, then the graphs would be parallel and have the same slope if their slope is defined. Example: x + y = 1 x + y = 2 Example with no slope: x = 1 x = 2
What are all the point slope equations of the line going through -4 -7and 3 2?
Points: (-4, -7) and (3, 2) Slope: 9/7 Equation: 7y = 9x-13 or as y = 9/7x-13/7
Which of the point-slope equations below are correct for the line that passes through points (6 5) and (3 3)?
To find the point-slope equation of the line passing through points (6, 5) and (3, 3), we first need to determine the slope (m). The slope is calculated as ( m = \frac{y_2 - y_1}{x_2 - x_1} = \frac{3 - 5}{3 - 6} = \frac{-2}{-3} = \frac{2}{3} ). Using the point-slope form ( y - y_1 = m(x - x_1) ), we can use either point to write the equation: for point (6, 5), it becomes ( y - 5 = \frac{2}{3}(x - 6) ) and for point (3, 3), it becomes ( y - 3 = \frac{2}{3}(x - 3) ). Both equations are correct for the line.
The point (2 -5) and has a slope of -7. What is the equation for this line in point-slope form?
The point-slope form of a linear equation is given by the formula ( y - y_1 = m(x - x_1) ), where ( m ) is the slope and ( (x_1, y_1) ) is a point on the line. For the point (2, -5) with a slope of -7, the equation becomes ( y - (-5) = -7(x - 2) ). Simplifying this, we get ( y + 5 = -7(x - 2) ). Therefore, the equation in point-slope form is ( y + 5 = -7(x - 2) ).
Find the point slope equations of the line using the point 7 4 and slope of?
y-4=3/2(x-7)
Which of the following equations of a line is in point-slope form?
y -1 = -1/2( x -2 )
What is the point-slope equation of the line with a slope equals -4 and a point of -2 3?
Which of the following is the point-slope equation of the line with a slope equals -4 and a point of -2 3?
How can you tell if two equations are parallel?
if they have the same slope If two linear equations are inconsistent - that is, have no solution, then the graphs would be parallel and have the same slope if their slope is defined. Example: x + y = 1 x + y = 2 Example with no slope: x = 1 x = 2
How do you change slope-intercept form to point-slope form?
Slope intercept form is y = mx + b. Point slope form is y - y1 = m(x - x1). Here is an example of changing slope-intercept form to point-slope form: Change y = 3x + 2 to point slope form: y = 3x + 2 Subtract 2 from each side: y -2 = 3x The equation y-2 = 3x is in point-slope form. It can be rewritten as y-2 = 3(x-0), showing that the line passes through the point (0,2), but is doesn't need to be. (The x1 and y1 represent one point on the line, it doesn't matter which one. Therefore, there are many different equations for the same line in point-slope form. For example, the equation y -2 = 3x is the same line as the equation y - 11 = 3(x - 3), which is the same line as the equation y + 4 = 3(x + 2).)
What is the slope of a line that passes through the point (-5 3) and is parallel to a line that passes through (213) and (-4-11)?
If you mean: (2, 13) and (-4, -11) then the slope is 4 and both equations will have the same slope of 4 but with different y intercepts
What are all the point slope equations of the line going through -4 -7and 3 2?
Points: (-4, -7) and (3, 2) Slope: 9/7 Equation: 7y = 9x-13 or as y = 9/7x-13/7
What is the point-slope form of a line with a slope -5 that contains the point (2-1)?
Point: (2, -1) Slope: -5 Equation: y = -5x+9
Which of the following equations has a slope of ½ and a y-intercept of -2?
[ Y = 1/2 x - 2 ]
What is the point slope equation if the slope is 2?
If (p, q) is any point on the line, then the point slope equation is: (y - q)/(x - p) = 2 or (y - q) = 2*(x - p)
What is the solution to this system of equations y equals -3x-2?
-1
What is the slope that passes through the point 2 1 and 2 - 3?
The line is vertical and so the slope is undefined.
