2-3
Perpendicular slope: -1/4 Perpendicular equation: y-0 = -1/4(x-3) => y = -0.25x+3
Perpendicular lines passing through a point are at right angles to each other.
Perpendicular slope: 1/2 Perpnedicular equation: y-5 = 1/2(x-2) => y = 0.5x+4
Yes, I could, if I knew the slope of the line given.
To determine the equation of a line that is perpendicular to another line and passes through the point (6, 2), we first need the slope of the original line. If the slope of the original line is ( m ), the slope of the perpendicular line will be ( -\frac{1}{m} ). Without the specific line's equation, we can't compute the exact perpendicular line. However, if you have options like A, B, etc., you can find the correct one by substituting the point (6, 2) into each equation to see which one satisfies it.
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.
That would depend on its slope which has not been given.
Perpendicular slope: -1/4 Perpendicular equation: y-0 = -1/4(x-3) => y = -0.25x+3
General formula
Perpendicular lines passing through a point are at right angles to each other.
If you mean y = 3x+8 then the perpendicular slope will be -1/3 and the equation works out as 3y = -x+9
Perpendicular slope: 1/2 Perpnedicular equation: y-5 = 1/2(x-2) => y = 0.5x+4
Yes, I could, if I knew the slope of the line given.
If you mean point (-1, 4) and equation of 4x-3y = -9 then y = 4/3x+3 Slope of equation: 4/3 Perpendicular slope: -3/4 Perpendicular equation: y-4 = -3/4(x--1) => 4y = -3x+13
Slope of line: 3 Perpendicular slope: -1/3 Equation: y-2 = -1/3(x-0) => y = -1/3x+2
Slope: -2 Equation: y--1 = -2(x-3) => y = -2x+5
If -14 is the y intercept then it is: y = -1/13x -14