Consider the given decagon of all equal sides.
Given: [tex] \angle ATB= 120^{\circ} [/tex]
To find: [tex] \angle TBP= ? [/tex]
Construction: Join a dotted line from point T to P.
Now, [tex] \angle ATB [/tex] and [tex] \angle BTP [/tex] lies on the straight line. Hence, they form linear pair.
Therefore, [tex] \angle ATB +\angle BTP= 180^{\circ} [/tex]
[tex] 120^{\circ} +\angle BTP= 180^{\circ} [/tex]
[tex] \angle BTP= 180^{\circ}-120^{\circ} [/tex]
[tex] \angle BTP = 60^{\circ} [/tex] (equation 1)
Now, consider triangle TBP with two equal sides TB and BP.
By using the property
"Angles opposite to equal sides of an isosceles triangle are equal."
Since TB=BP, therefore the angles opposite to these sides are also equal.
[tex] \angle BPT= \angle BTP [/tex]
From equation 1,
[tex] \angle BPT= \angle BTP = 60^{\circ} [/tex]
Now, in triangle TBP,
By using angle sum property, which states
" The sum of measures of all three angles of a triangle is 180 degrees"
[tex] \angle BPT+ \angle BTP+ \angle TBP= 180^{\circ} [/tex]
[tex] 60^{\circ}+60^{\circ}+ \angle TBP= 180^{\circ} [/tex]
[tex] 120^{\circ}+ \angle TBP= 180^{\circ} [/tex]
[tex] \angle TBP= 180^{\circ}-120^{\circ} [/tex]
[tex] \angle TBP= 60^{\circ} [/tex]
So, the measure of angle TBP is 60 degrees.
