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iGCSE (2021 Edition)

11.17 Perpendicular lines (Extended)

Lesson

Perpendicular lines (Extended)

Lines that meet at right angles ($90^\circ$90°) are called perpendicular lines. 

Play with this applet creating pairs of perpendicular lines.  

Fill in this table as you go.

Gradient of line 1 $m_1$m1      
Gradient of line 2 $m_2$m2      
Product of line 1 and line 2 $m_1\times m_2$m1×m2      

What do you notice about the product of the gradients of lines $1$1 and $2$2?  (The pair of perpendicular lines)

You will have discovered the perpendicular lines have gradients whose product is equal to $-1$1.

We say that $m_1$m1 is the negative reciprocal of $m_2$m2.  

Negative reciprocal is a complex sounding term, but it just means two numbers that have opposite signs and are reciprocals of each other. 

Here are some examples of negative reciprocals:

$2$2 and $-\frac{1}{2}$12

$\frac{3}{4}$34 and $-\frac{4}{3}$43

$-10$10 and $\frac{1}{10}$110

Perpendicular lines
  • Two lines are perpendicular if their gradients are negative reciprocals of each other. 
  • To test if lines are perpendicular multiply the gradients together. If the result is $-1$1 then the lines are perpendicular. 

 

Practice questions

Question 1

A line which passes through the point $\left(0,6\right)$(0,6) is perpendicular to $y=-3x+5$y=3x+5.

  1. Find the gradient of this perpendicular line.

  2. State the equation of the perpendicular line.

Outcomes

0607C4.5

Gradient of parallel lines.

0607E4.5

Gradient of parallel and perpendicular lines.

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