p (2,-1) and slope 3
the Equation of a Line Given That You Know Two Points it Passes Through.
0
You haven't given points, you've just given single values. for there to be a point in a plane, you need 2 coordinates, both x and y
The standard equation for a straight line is y = mx + c. Let this be the equation of the original line. Note that m and c are known values. Let the given point coordinates be (a,b)Two straight lines are perpendicular if the product of their gradients (slopes) is -1.The slope (m1) of the perpendicular line is therefore m1 = -1/mWhen y = b then x = a so the equation for the perpendicular line is y = m1x + d, and substituting gives : b = -a/m + d and this will enable d to be calculated.NOTE : In the absence of information for the equation of the original line and the coordinates of the given point then this is a general rather than a specific answer.
Without an equality sign and not knowing the plus or minus values of the given terms it can't be considered to be a straight line equation. But if you mean 4x+y = 10 then y = -4x+10 and the parallel equation is y = -4x+6
Coordinate geometry
Write the equation of a line in slope-intercept form that has a slope of -2 and passes through the point (2, -8).
Write an equation in slope-intercept form for the line that passes through the given point and is parallel to the given line (-7,3); x=4
(0,-6) m=-2
The equation is x = -7.
Yes, I could, if I knew the slope of the line given.
The equation for the given points is y = x+4 in slope intercept form
Parallel straight line equations have the same slope but with different y intercepts
That depends on the equation that it is perpendicular too which has not been given but both equations will meet each other at right angles.
the Equation of a Line Given That You Know Two Points it Passes Through.
Any equation parallel to the x-axis is of the form:y = constant In this case, you can figure out the constant from the given point.
Any equation parallel to the x-axis is of the form:y = constant In this case, you can figure out the constant from the given point.