In the given triangle the sum of the interior angles of triangle ACB is equal to 180 degrees, therefore, we have the following relationship:
[tex]\angle CAB+\angle ABC+\angle BCA=180[/tex]
Replacing the values we get:
[tex]90+48+\angle BCA=180[/tex]
Solving the operations:
[tex]138+\angle BCA=180[/tex]
Now we solve for angle BCA by substracting 138 to both sides:
[tex]\begin{gathered} \angle BCA=180-138 \\ \angle BCA=42 \end{gathered}[/tex]
Now, since segments CD and CE are equal, this means that triangle CDE is an isosceles triangle, therefore, its base angles are the same, and we have the following relationship:
[tex]\angle CDE+\angle DEC+\angle ECD=180[/tex]
Replacing the known values:
[tex]2\angle DEC+42=180[/tex]
Now we solve for angle DEC by subtracting 42 to both sides:
[tex]\begin{gathered} 2\angle DEC=180-42 \\ 2\angle DEC=138 \end{gathered}[/tex]
Now we divide both sides by 2:
[tex]\begin{gathered} \angle DEC=\frac{138}{2} \\ \angle DEC=69 \end{gathered}[/tex]
Now, angles DEC and DEB are supplementary, therefore, their sum adds up to 180, therefore, we have:
[tex]\angle DEC+\angle\text{DEB}=180[/tex]
Replacing the known angle:
[tex]69+\angle DEB=180[/tex]
Subtracting 69 to both sides:
[tex]\begin{gathered} \angle DEB=180-69\rbrack \\ \angle DEB=111 \end{gathered}[/tex]
Therefore, angle DEB measures 111 degrees.
