A curve passing through (1, 0) is such t...

A curve passing through `(1, 0)` is such that the ratio of the square of the intercept cut by any tangent on the y-axis to the Sub-normal is equal to the ratio of the product of the Coordinates of the point of tangency to the product of square of the slope of the tangent and the subtangent at the same point, is given by

`x=e^(pm2sqrt(y//x))`

`x=e^(pmsqrt(y//x))`

`x=e^(pmsqrt(y//x))-1`

`xy+e^(pm(y//x))-1=0`

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