Question

Write the condition to be satisfied by a, b and c so that the quadratic equation ax^2 + bx +c=0 has two
distinct real roots.​

Answer 1

ANSWER ⤵️

If a=0, it becomes linear equation.

If b²− 4ac = 0, then there will be real and equal roots.

If b² − 4ac < 0, then the roots will be unreal.

Only if b²− 4ac > 0, we will get two real distinct roots.

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Answer 2

Answer:

it will quadratic equation if a≠0

if a=0,then we get linear equation because 0×x² is invaluable

so it will bx+c=0

which is linear equation

if b² -4ac=0

then we get 2real and equal roots

if b²-4ac<0

then we will get imaginary roots, means no real root can be found

but

if

b²-4ac>0

then we get real and distinct roots

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