If the roots of the quadratic equation (...

If the roots of the quadratic equation `(a-b) x^(2) + (b - c) x + (c - a) =0 ` are equal , prove that `b +c = 2a`

AI Generated Solution

QUADRATIC EQUATIONS
EDUCART PUBLICATION|Exercise LONG ANSWER Type Questions [4 marks]|19 Videos
QUADRATIC EQUATIONS
EDUCART PUBLICATION|Exercise SHORT ANSWER (SA-I) Type Questions [ 2 marks]|15 Videos
POLYNOMIALS
EDUCART PUBLICATION|Exercise LONG ANSWER TYPE QUESTIONS|5 Videos
REAL NUMBERS
EDUCART PUBLICATION|Exercise LONG QUESTION TYPE QUESTIONS|5 Videos

Similar Questions

Explore conceptually related problems

Find the roots of quadratic equation ax^(2) + (a-b + c) x - b +c = 0 .

The roots of the quadratic equation (a+b-2c)x^(2)+(2a-b-c)x+(a-2b+c)=0 are

Show that the roots of the quadratic equation: (b - c)x^(2) + (c - a) x + (a - b) = 0 are equal if c + a = 2b.

If roots of equation a-b)x^(2)+(b-c)x+(c-a)=0 are equal then prove that b+c=2a

If the roots of the equation (a^(2) + b^(2))x^(2) - 2(ac + bd) x + (c^(2) + d^(2)) = 0 are equal prove that (a)/(b) = (c )/(d)

In the quadratic equation 4x^(2) - 2 ( a + c - 1) x + ac - b = 0 (a gt b gt c)

If the roots of the equation (b-c)x^(2)+(c-a)x+(a-b)=0 are equal,then prove that 2b=a+c