RohitShubesh21
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- 2024
hello sirs, I found that diagonals equal to each other but not sure if that mean it bisect, can someone show proper proof thank u sirs
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prove diagonals of parallelogram bisect each other using vector methods (1 Viewer)
- Thread starter RohitShubesh21
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The diagonals of a parallelogram bisect each other. So in a //gram ABCD, the diagonals AC and BD bisect each other. What this means is that AC cuts BD into 2 equal halves and BD cuts AC into 2 equal halves.
In an arbitrary quadrilateral ABCD, diagonal AC may cut diagonal BD into 2 equal halves, but BD will not cut AC into 2 equal halves unless ABCD is a //gram; in which case it is no longer an arbitrary quadrilateral.
Let ABCD be a parallelogram. Therefore has 2 sides parallel and equal in length. Without loss of generality, let these be AD & BC; .: AD//BC.
Let the mid-point of AC and of BD be E and F respectively. Let the position vectors OA, OB, ... , OE, and OF be resp.:
 = \frac{1}{2}(\bar a + \bar c)\\ \\ $Similarly $ \overrightarrow {OF} = \frac {1}{2}(\bar b + \bar d) \\ \\ \overrightarrow {AD} = \overrightarrow {BC} \implies \bar d - \bar a = \bar c - \bar b \implies \bar a + \bar c = \bar b + \bar d \\ \\ \therefore \overrightarrow {OE} = \overrightarrow {OF})
That means the points E and F are the same point.
Therefore the mid-point of AC is the mid-point of BD
That means the diagonals of //gram ABCD bisect each other.
QED
Strictly speaking, I should start from the property: AB//DC and AD//BC without assuming opp sides are equal.
In an arbitrary quadrilateral ABCD, diagonal AC may cut diagonal BD into 2 equal halves, but BD will not cut AC into 2 equal halves unless ABCD is a //gram; in which case it is no longer an arbitrary quadrilateral.
Let ABCD be a parallelogram. Therefore has 2 sides parallel and equal in length. Without loss of generality, let these be AD & BC; .: AD//BC.
Let the mid-point of AC and of BD be E and F respectively. Let the position vectors OA, OB, ... , OE, and OF be resp.:
That means the points E and F are the same point.
Therefore the mid-point of AC is the mid-point of BD
That means the diagonals of //gram ABCD bisect each other.
QED
Strictly speaking, I should start from the property: AB//DC and AD//BC without assuming opp sides are equal.
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