PQRSTU is a regular hexagone dwtwrmine each angle of PQT
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Properties of hexagon:
Angle tup = 120 degrees
tu = up
Therefore angle utp = angle upt = 30 degrees (two sides being
equal, corresponding angles equal)
So angle tpq = 90 degrees
Draw a mid-point ‘a’ on tp
Pt = 2* ta
tan (angle tqp) = tp / pq
= 2* tu * cos 30
= square root 3x / x
= 2 * x * square
root 3 / 2 = square
root 3
= square root 3x Therefore, angle tqp =
60 degrees
So the angles are : angle tpq = 90 degrees , angle tqp = 60
degrees and angle ptq = 30 degrees.
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Angle tup = 120 degrees
tu = up
Therefore angle utp = angle upt = 30 degrees (two sides being
equal, corresponding angles equal)
So angle tpq = 90 degrees
Draw a mid-point ‘a’ on tp
Pt = 2* ta
tan (angle tqp) = tp / pq
= 2* tu * cos 30
= square root 3x / x
= 2 * x * square
root 3 / 2 = square
root 3
= square root 3x Therefore, angle tqp =
60 degrees
So the angles are : angle tpq = 90 degrees , angle tqp = 60
degrees and angle ptq = 30 degrees.
Read more on Brainly.in - https://brainly.in/question/376248#readmore
hope it will help you
if it plz mark me brainlist
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