First, we must solve the equation for y to determine the slope:  y = 2x + ³/₂

By looking at the coefficient in front of x, we know that the slope of this line has a value of 2. To fine the slope of any line perpendicular to this one, we take the negative reciprocal of it:

slope = m , perpendicular slope = – ¹/_m

slope = 2 , perpendicular slope = – ¹/₂

Find the slope of the given line.  The perpendicular slope will be the opposite reciprocal of the original slope.  Use the slope-intercept form (y = mx + b) and substitute in the given point and the new slope to find the intercept, b.  Convert back to standard form of an equation:  ax + by =  c.

First rearrange the equation so that it is in slope-intercept form, resulting in y=2/3 x + 14/9. The slope of this line is 2/3, so the slope of the line perpendicular will have the opposite reciprocal as a slope, which is -3/2.

Perpendicular lines have slopes that are the opposite of the reciprocal of each other. In this case, the slope of the first line is -2. The reciprocal of -2 is -1/2, so the opposite of the reciprocal is therefore 1/2.

First we must find the slope of the given line. The slope of y = –3x – 4 is –3. The slope of the perpendicular line is the negative reciprocal. This means you change the sign of the slope to its opposite: in this case to 3. Then find the reciprocal by switching the denominator and numerator to get 1/3; therefore the slope of the perpendicular line is 1/3.

The question puts the line in point-slope form y – y₁ = m(x – x₁), where m is the slope. Therefore, the slope of the original line is 1/2.  A line perpendicular to another has a slope that is the negative reciprocal of the slope of the other line. The negative reciprocal of the original line is –2, and is thus the slope of its perpendicular line. 

The equation of a line is  where  is the slope.

Rearrange the equation to match this:

For the perpendicular line, the slope is the negative reciprocal;

therefore 

First, you must find the slope of the line given to you. Remember that the slope is calculated: 

Thus, for our data, this is:

Now, the perpendicular slope to this is opposite and reciprocal. Hence, it must be . This only holds for the equation 

To know this, solve the equation for the format . This will let you find the slope very quickly, for it is . First, add  to both sides:

Next, divide everything by :

You really just need to pay attention to the  term. This reduces to , which is just what you need!

Perependicular lines have slopes whose product is .

 and so the answer is 

To find the slope of a perpendicular line, we take the reciprocal  of the known slope , where . 

The easy way to do this is to simply take the fraction (a whole slope can be made into a fraction by placing  in the denominator), exchange the numerator and denominator, then multiply the fraction by 

However, if we attempt to follow this procedure, we get:

, which is undefined.

Thus, our perpendicular line (which is a vertical line) has an undefined slope.