If one root of the equation is then
Explanation for the correct option
Step 1: Information required for the solution
We know that the quadratic equation of the forms has its sum of the roots equal to the coefficient of the that is and product of the roots is equal to the constant .
To convert the given equation in the form we need to divide the equation by .
The equation will become .
Let the roots of the equation be then the two equations will be,
Step 2: Calculation of the value
Since one root of the equation is let this be equal to . The other root will be which is equal to .
From equation ,
Now, the product of the roots will be
From equation ,
Therefore, the value of and .
Hence, the correct option is (A).