Two lines are perpendicular when their slopes are negative reciprocals. This means that the product of a given slope and the slope of a line perpendicular to it will be -1.
m_1* m_2=-1
For any equation written in slope-intercept form, y= mx+b, we can identify its slope as the value of m. Looking at the given equation, we can see that its slope is 14.
y= 1/4x-9
By substituting this value into our negative reciprocal equation for m_1, we can solve for the slope of a perpendicular line, m_2.
Any line perpendicular to the given equation will have a slope of -4.
Writing the Perpendicular Line's Equation
Using the slope m_2= -4, we can write a general equation in slope-intercept form for all lines perpendicular to the given equation.
y= -4x+ b
By substituting the given point ( 1, 1) into this equation for x and y, we can solve for the y-intercept b of the perpendicular line.
Now that we have the y-intercept, we can complete the equation. The line given by this equation is both perpendicular to y= 14x-9 and passes through the point (1,1).
y= -4x+ 5
