With respect to the roots of x2–2x–3=0, we can say that the roots are
Step 1:- For x2–2x–3=0, value of discriminant
D=(−2)2–4(−3)(1)=4+12=16.
Step 2:- Since, D is a perfect square, roots are rational and unequal.
Step 3:- Solving the equation,
x=−(−2)+√(16)2 or −(−2)−√(16)2
x=3,−1
Thus, the roots are real and distinct.