In a rectangle PQRS, the diagonal intersects at O. if angle POQ = 62 degree, then angle angle angle OSR ?
Answers
Answer:
PQRS is a rectangle in which O is the intersection point of both the diagonals PR and QS
We have angle POQ= 110°
Now we need to find out , anglePQO and angle PSQ
As we know in rectangle both the diagonals are equal
So, PR = QS
Also diagonals bisect each other
So PO = QO
Hence, anglePQO = angleOPQ ……………1
Now in triangle POQ ,
AnglePQO + anglePOQ + angleOPQ = 180°
anglePQO + 110 + anglePQOc = 180 (from eqn 1)
2 anglePQO = 180-110
anglePQO = 70/2 = 35°
now , in triangle PQS
anglePQS + angleQPS +anglePSQ = 180
35 + 90 + anglePSQ = 180
125 + anglePSQ = 180
anglePSQ = 180-125 = 55°
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Step-by-step explanation:
PQRS is a rectangle in which O is the intersection point of both the diagonals PR and QS
We have angle POQ= 110°
Now we need to find out , anglePQO and angle PSQ
As we know in rectangle both the diagonals are equal
So, PR = QS
Also diagonals bisect each other
So PO = QO
Hence, anglePQO = angleOPQ ……………1
Now in triangle POQ ,
AnglePQO + anglePOQ + angleOPQ = 180°
anglePQO + 110 + anglePQOc = 180 (from eqn 1)
2 anglePQO = 180-110
anglePQO = 70/2 = 35°
now , in triangle PQS
anglePQS + angleQPS +anglePSQ = 180
35 + 90 + anglePSQ = 180
125 + anglePSQ = 180
anglePSQ = 180-125 = 55°
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