The general form of a quadratic equation in x is, ax2+bx+c=0,
where a, b, c Є R & a≠0.
Results:
1. The solution of the quadratic equation, ax2+bx+c=0 is given by
The expression b2-4ac =D is called the discriminant of the quadratic equation.
2. If α and β are the roots of the quadratic equation ax2+bx+c=0, then ;
A. α+β= - ![]()
B. αβ= ![]()
C. α-β= ![]()
3. Nature of roots:
A. Consider the quadratic equation ax2+bx+c=0 where a, b, c Є R & a≠0 then;
i. D>0
roots are real & distinct (unequal).
ii. D=0
roots are real & coincident (equal).
iii. D<0
roots are imaginary.
iv. If p+iq is one root of a quadratic equation, then the other must be the conjugate p-iq & vice versa. ( p,q Є R & i= ![]()
B. Consider the quadratic equation ax2+bx+c=0 where a, b, c Є Q & a≠0 then;
i. If D>0 & is a perfect square, then roots are rational & unequal.
ii. If α=p+
is one root in this case, (where p is rational &
is a surd) then the other root must be the conjugate of it i.e. β=p-
& vice versa.
4. A quadratic equation whose roots are α and β is (x-α)(x-β)=0
i.e. x2-(α+β)x+αβ =0
i.e. x2-( sum of roots)x+product of roots=0
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