the following table ratio is given in column find the remaining two ratio in the column and complete the table sin = ?, cos=1/√3,tan=?
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In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.In the given figure, ∠CAB = ∠CBA, D and E are points on the sides BC and AC respectively of ∆ABC such
that BD = AE. If O is the point of intersection of AD and BE, then prove that OA = OB.