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If you mean points of: (1, 1) and (4, -1)
Then the slope works out as: -2/3
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What is the slope of the line that passes through the points (-5-39) and (1084)?
If you mean points of: (-5, -39) and (10, 84) then the slope works out as 41/5 which is the same as 8.2
What is the slope of line -41 and 14?
If you mean: (-4, 1) and (1, 4) Then the slope works out as: 3/5
What slope line passesugh (40-64) and (41-35)?
It works out as 29
What is an equation of a line passing through (25) and (-41)?
Points: (2, 5) and (-4, 1) Slope: 2/3 Equation: 3y = 2x+11
What is the slope of (-62) (41)?
if you mean points of (-6, 2) and (4, 1) then the slope works out as -1/10
What is the slope of the line that passes through the points (-5-39) and (1084)?
If you mean points of: (-5, -39) and (10, 84) then the slope works out as 41/5 which is the same as 8.2
Write the point-slope equation of the line that goes through 5 3 with a slope of -12?
A line in the X-Y plane follows an equation y = (slope X x) plus a constant k. In this instances, 5 = [(-12)(3)] + k, or k = 5 + 36 = 41. Therefore, the equation is: y = -12x + 41.
What is the slope of line -41 and 14?
If you mean: (-4, 1) and (1, 4) Then the slope works out as: 3/5
What slope line passesugh (40-64) and (41-35)?
It works out as 29
What is an equation of a line passing through (25) and (-41)?
Points: (2, 5) and (-4, 1) Slope: 2/3 Equation: 3y = 2x+11
What is the slope of (40-64) (41-35)?
Points: (40, -64) and (41, -35) Slope: 29
What line passes through (-2-2) and (-41)?
The Tropic of Capricorn passes through Botswana.
What is the slope of (-62) (41)?
if you mean points of (-6, 2) and (4, 1) then the slope works out as -1/10
What is the slope of the line passing through2 -8 and 41?
Do you mean 2, -8 and 4, 1? If so then it is: (1--8) over (4-2) = 9/2 = 4.5
The line y mx c passes through the points -2 -2 and 41?
This has infinite no. of solutions.
What is the standard form of the equation of the line with slope 9 passing through the point 5 4?
It is: y-4 = 9(x-5) => y = 9x-41 Or as: 9x-y-41 = 0. Another version of the standard form of a linear equation in coordinates x and y is y = s x + k, where s is the slope and k is a constant. In this question, the slope s is directly given, as is the value of y at the point where x = 5 so that- 44. The slope is always the coefficient of x in this standard form, and the constant k can be determined by solving the equation for the coordinates of the given point: When x = 5, y = (9 X 5) + k, and y(5) is stated by the question to be 4. 9 X 5 equals 45; therefore to obtain the right value for k, 45 + k =4 or k = - 41. The standard form of the equation is therefore y = 5x - 41.
What equation in slope intercept form represents the line that passes though the two points (25) (92)?
If you mean points: (2, 5) and (9, 2) then it works out as y = -3/7x+41/7
