Question

if the roots of the polynomial
(p)= 3x²-3x+13m-9 are inverse to each other then find tje value of m.​

Answer 1

EXPLANATION.

Quadratic polynomial.

⇒ 3x² - 3x + 13m - 9 = 0.

One root is inverse to other.

As we know that,

Let the one root be = α.

Other root = 1/α.

Products of the zeroes of the quadratic equation.

⇒ αβ = c/a.

⇒ α(1/α) = 13m - 9/3.

⇒ 1 = 13m - 9/3.

⇒ 3 = 13m - 9.

⇒ 3 + 9 = 13m.

⇒ 12 = 13m.

⇒ m = 12/13.

                                                                                                                         

MORE INFORMATION.

Nature of the factors of the quadratic expression.

(1) = Real and different, if b² - 4ac > 0.

(2) = Rational and different, if b² - 4ac is a perfect square.

(3) = Real and equal, if b² - 4ac = 0.

(4) = If D < 0 Roots are imaginary and unequal or complex conjugate.

Answer 2

Answer:

Quadratic polynomial.

3x^2 - 3x + 13m - 9 = 0.

One root is inverse to other. As we know that,

Let the one root be = a.

Other root = 1/a.

Products of the zeroes of the quadratic equation.

aß = c/a.

a(1/a) = 13m - 9/3.

1 = 13m - 9/3.

3 = 13m - 9.

3 +9 = 13m.

12 = 13m.

m = 12/13