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Linear Pairs

Two adjacent angles that form a straight line.

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Linear Pairs

What if you were given two angles of unknown size and were told they form a linear pair? How would you determine their angle measures? After completing this Concept, you'll be able to use the definition of linear pair to solve problems like this one.

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CK-12 Linear Pairs


Two angles are adjacent if they have the same vertex, share a side, and do not overlap \begin{align*}\angle PSQ\end{align*} and \begin{align*}\angle QSR\end{align*} are adjacent.

A linear pair is two angles that are adjacent and whose non-common sides form a straight line. If two angles are a linear pair, then they are supplementary (add up to \begin{align*}180^\circ\end{align*}). \begin{align*}\angle PSQ\end{align*} and \begin{align*}\angle QSR\end{align*} are a linear pair.

Example A

What is the measure of each angle?

These two angles are a linear pair, so they add up to \begin{align*}180^\circ\end{align*}.

\begin{align*}(7q-46)^\circ + (3q+6)^\circ &= 180^\circ\\ 10q - 40^\circ &= 180^\circ\\ 10q & = 220\\ q & = 22\end{align*}

Plug in \begin{align*}q\end{align*} to get the measure of each angle. \begin{align*}m\angle ABD = 7(22^\circ) - 46^\circ = 108^\circ \ m\angle DBC = 180^\circ - 108^\circ = 72^\circ\end{align*}

Example B

Are \begin{align*}\angle CDA\end{align*} and \begin{align*}\angle DAB\end{align*} a linear pair? Are they supplementary?

The two angles are not a linear pair because they do not have the same vertex. They are supplementary because they add up to \begin{align*}180^\circ\end{align*}: \begin{align*}120^\circ + 60^\circ = 180^\circ\end{align*}.

Example C

Find the measure of an angle that forms a linear pair with \begin{align*}\angle MRS\end{align*} if \begin{align*} m\angle MRS\end{align*} is \begin{align*} 150^\circ\end{align*}.

Because linear pairs have to add up to \begin{align*}180^\circ\end{align*}, the other angle must be \begin{align*}180^\circ-150^\circ=30^\circ\end{align*}.

CK-12 Linear Pairs

Guided Practice

Use the diagram below. Note that \begin{align*}\overline{NK} \perp \overleftrightarrow{IL}\end{align*}.

1. Name one linear pair of angles.

2. What is \begin{align*}m\angle INL\end{align*}?

3. What is \begin{align*}m\angle LNK\end{align*}?

4. If \begin{align*}m\angle INJ = 63^\circ\end{align*}, find \begin{align*}m\angle MNI\end{align*}.


1. \begin{align*} \angle MNL \end{align*} and \begin{align*}\angle LNJ\end{align*}

2. \begin{align*}180^\circ\end{align*}

3. \begin{align*}90^\circ\end{align*}

4. \begin{align*}180^\circ - 63^\circ=117^\circ\end{align*}


For 1-5, determine if the statement is true or false.

  1. Linear pairs are congruent.
  2. Adjacent angles share a vertex.
  3. Adjacent angles overlap.
  4. Linear pairs are supplementary.
  5. Supplementary angles form linear pairs.

For exercise 6, find the value of \begin{align*}x\end{align*}.

Find the measure of an angle that forms a linear pair with \begin{align*}\angle MRS\end{align*} if \begin{align*} m\angle MRS\end{align*} is:

  1. \begin{align*}61^\circ\end{align*}
  2. \begin{align*}23^\circ\end{align*}
  3. \begin{align*}114^\circ\end{align*}
  4. \begin{align*}7^\circ\end{align*}
  5. \begin{align*}179^\circ\end{align*}
  6. \begin{align*}z^\circ\end{align*}


Adjacent Angles

Adjacent Angles

Two angles are adjacent if they share a side and vertex. The word 'adjacent' means 'beside' or 'next-to'.
linear pair

linear pair

Two angles form a linear pair if they are supplementary and adjacent.


A diagram is a drawing used to represent a mathematical problem.

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