In writing a quadratic equation of the form `x^(2) + px + q = 0`,a student makes a mistake in writing the coefficientof x and gets the roots as 8 and 12. Another student makes mistake in writing the constant term and gets the roots as 7 and 3. Find the correct quadratic equation.

In solving quadratic equation x^(2) + px + q = 0 , one student makes mistake only in the constant term obtains 4 and 3 as the roots. Another students makes a mistake only in the coefficient of x and finds - 5 and - 2 as the roots. Determine the correct equation

Two persons A and B solved a quadratic equation of the form x^(2) + bx + c = 0 . A made a mistake in noting down the coefficient of x and obtained the roots as 18 and 2, where as B obtained the roots as -9 and -3 by misreading the constrant term. The correct roots of the equation are

In copying a quadratic equation of the form x^(2)+px+q=0, a student wrote the coefficients of x incorrectly and the roots were found to be 3 and 10; another student wrote the same equation but he wrote the constant term incorrectly and thus,he found the roots to be 4 and 7 .The roots of the correct equation are

Write the quadratic equation if the roots are: 0 and 7

Write the quadratic equation if the roots are 0 and 4.

In solving a quadratic equation x^(2) + px + q = 0 a student made a mistake in copying the coefficient of x and obtined the root as 4, -3 but one of the actual roots is 2 what is the difference between the actual and wrong values of the coefficients of x ?

Write the quadratic equation if the roots are 3 and -10.

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