Find the ratio in which the point of intersection of less than ogive and more than ogive is (14.5, 20).Find the value of median
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Here's , Your Answer :-
=) The median for the coordinates of intersection point of less than ogive and more than ogive will be - (negative) .
The median of grouped data is the x-coordinate of the point of intersection of the two ogives. Here, the ‘less than ogive’ and ‘more than ogive’ intersect at (14.5, 20).
So, median = 14.5
__________________________
__________________________
HOPE , IT HELPS ... ✌️
____________________________
____________________________
Here's , Your Answer :-
=) The median for the coordinates of intersection point of less than ogive and more than ogive will be - (negative) .
The median of grouped data is the x-coordinate of the point of intersection of the two ogives. Here, the ‘less than ogive’ and ‘more than ogive’ intersect at (14.5, 20).
So, median = 14.5
__________________________
__________________________
HOPE , IT HELPS ... ✌️
Answered by
1
Solution :-
The median for the coordinates of intersection point of less than ogive and more than ogive will be- negative
The median of grouped data is the x-coordinate of the point of intersection of the two ogives. Here, the ‘less than ogive’ and ‘more than ogive’ intersect at (14.5, 20).
so, median = 14.5
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@GauravSaxena01
The median for the coordinates of intersection point of less than ogive and more than ogive will be- negative
The median of grouped data is the x-coordinate of the point of intersection of the two ogives. Here, the ‘less than ogive’ and ‘more than ogive’ intersect at (14.5, 20).
so, median = 14.5
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@GauravSaxena01
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