If Alpha and beta are zeros of x square - 3 x plus two write a quadratic polynomial with zeros 1/ 2 alpha + beta
______________
and 1/ 2 beta plus Alpha
_________________
Answers
its same u can find it yourself
Answer:
If alpha and beta are the zeros of the quadratic polynomial 3x^2-4x+1, find a quadratic polynomial whose zeros will be alpha^2/beta and beta^2/alpha.
Step-by-step explanation:
α and β are the zeros of 3x²-4x +1 polynomial,
first of all we factorise 3x²-4x+1
3x² -4x + 1
=3x² -3x -x +1
=3x( x -1) -1(x -1)
=(3x -1)(x -1)
hence. (3x -1) and (x -1) are the factors of given polynomial .
so, x = 1/3 and 1 are the zeros of that polynomial.
hence, α = 1/3. and β = 1
or α = 1 and β. = 1/3
you can choose any one in both
I choose α = 1. and β = 1/3
now,
let any unknown. polynomial. whose zeros are α²/β and β²/α
α²/β = (1)²/(1/3) = 3
β²/α = (1/3)²/1 = 1/9
now, equation of unknown polynomial.
x²- ( sum of roots)x + product of roots
= x²- ( α²/β + β²/α)x +(α²/β)(β²/α)
put α²/β = 3 and β²/α = 1/9
= x²- ( 3 +1/9)x + 3 × 1/9
= x² -28x/9 + 3/9
={ 9x² -28x + 3 }1/9
hence, 9x² -28x + 3 is answer
Read more on Brainly.in - https://brainly.in/question/1197096#readmore