Specify the type of quadrilateral ABCD in each case, given the following Information.
1. AO = OC, DO = OB, DB ﬩ AC, ∠ DAB = 630
, O being the point of
intersection of diagonals.
Answers
Answer:
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O.
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now,
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other.
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other. So, for ABCD to be a parallelogram,
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other. So, for ABCD to be a parallelogram, AO /OC= 1 / 1
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other. So, for ABCD to be a parallelogram, AO /OC= 1 / 1 But here
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other. So, for ABCD to be a parallelogram, AO /OC= 1 / 1 But here AO /OC= 1 /2
Let ABCD be the quadrilateral in which AC and BD are the diagonals that intersect at O. Now, AO /OC =1 /2 We know that diagonals of a parallelogram bisect eah other. So, for ABCD to be a parallelogram, AO /OC= 1 / 1 But here AO /OC= 1 /2 So, the quadrilateral can 't be a parallelogram in which point of intersection of the diagonals divide one diagonal in the ratio of 1 : 2.
Hope this helps you mate!
Step-by-step explanation:
Specify the type of quadrilateral ABCD in each case, given the following Information.
1. AO = OC, DO = OB, DB ﬩ AC, ∠ DAB = 630
, O being the point of
intersection of diagonals.