Suppose that two persin A and solve the equation #oxb., while solving commits antake in constant term and is the sand and commits mitteln the coefficient of and find the roots - and - The difference of Dots of the equation will be

Suppose that two persons A and B solve the equation x^(2)+ax+b=0 . While solving A commits a mistake in constant term and finds the roots as 6 and 3 and B commits a mistake in the coefficient of x and finds the roots as -7 and -2. Then the equation is

Suppose that two persons A and B solve the equation x^(2)+ax+b=0 . While solving A commits a mistake in constant term and find the roots as 6 and 3 and B commits a mistake in the coefficient of x and finds the roots as -7and-2 .Then , the equation is a) x^(2)+9x+14=0 b) x^(2)-9x+14=0 c) x^(2)+9x-14=0 d) x^(2)-9x-14=0

Ramesh and Mahesh solve an equation. In solving Ramesh commits a mistake in constant term and find the roots are 8 and 2. Mahesh commits a mistake in the coefficient of x and find the roots -9 and -1. The corret roots are

A and B solve an equation x^(2)+px+q=0. Insolving A commits a mistake in reading p and finds the roots 2 and 6 and B commits a mistake in reading q and finds the roots 2 and -9. Find the correct roots.

Ramesh and Mahesh solve a quadratic equation.Ramesh reads its constant term wrong its roots as 8 and 2 where as Mahesh reads the coefficientof x wrong and finds its roots as -11 and 1. The correct roots of the equation are

In solving a problem that reduces to a quadratic equation,one student makes a mistake in the constant term and obtains 8 and 2 for roots.Another student makes a mistake only in the coefficient of first-degree term and finds -9 and -1 for roots.The correct equation is

Sachin and Rahul attempted to solve a quadratic equation. Sachin made a mistake in writing down the constant term and ended up in roots (4,3). Rahul made a mistake in writing down coefficient of x to get roots (3, 2). The correct roots of equation are:

8. Sachin and Rahul attempted to solve a quadratic equation. Sachin made a mistake in writing down the constant term and ended up in roots (4,3). Rahul made a mistake in writing down coefficient of x to get roots (3, 2). The correct roots of equation are: