In figure the line segment xy is parallel to side AC of `Delta ABC` and it divides the triangle into two parts of equal areas. Find the ratio `(AX)/(AB)`

In Figure the line segment XY is parallel to side AC of DeltaA B C and it divides the triangle into two parts of equal areas. Find the ratio (A X)/(A B) .

In Fig, the line segment XY is parallel to side AC of Delta ABC and it divides the triangle into two parts of equal areas. Find the ratio (AX)/(AB) .

In the given figure, the line segment XY is parallel to side AC of DeltaABC and it divides the Deltainto two parts of equal areas. Find the ratio (AX)/(AB) .

In the given figure, line the segment XY is parallel to side AC of Delta ABC and it divides the triangles into two parts of equal area. Prove that AX:AB=(2-sqrt(2)):2

In DeltaABC XY||AC and XY divides the Triangle into two parts of equal area. Find the ratio of (AX)/(XB) .

In Delta ABC , XY || AC and XY divides the triangle into two parts of equal area. Find the ratio of (AX)/(XB) .

In Delta ABC , XY || AC and XY divides the triangle into two parts of equal area. Find the ratio of (AX)/(XB) .

In the given figure, the line segment XY is Parallel to AC of ΔABC and it divides the triangle into two parts of equal areas. Prove that (AX)/(AB)=(sqrt2-1)/(sqrt2)

In Delta ABC , XY || BC and XY divides the triangle into two parts of equal area. Find BX : AB . [Hint : ABC = 2 Delta AXY ]