Alph β are the zeros of the polynomial p(x)=3x^2+5x+7 then find the value of 1/alph^2 +1/beta^2
Answers
Answer:-
Given:
α & β are the zeroes of the Polynomial 3x² + 5x + 7.
On comparing with standard form of a Quadratic equation i.e., ax² + bx + c = 0 ;
Let,
- a = 3
- b = 5
- c = 7
We know that,
Sum of the zeroes = - b/a
⟹ α + β = - 5/3 -- equation (1)
Product of the zeroes = c/a
⟹ αβ = 7/3 -- equation (2)
Now,
We have to find:
⟹ 1/α² + 1/β²
Taking LCM we get,
⟹ (β² + α²)/(α²β²)
we know that,
(a + b)² = a² + b² + 2ab
⟹ (a + b)² - 2ab = a² + b²
⟹ (α + β)² - 2αβ = α² + β²
Again using aⁿ * bⁿ = (ab)ⁿ we get,
⟹ [ (α + β)² - 2αβ ] / (αβ)²
Putting the values from equations (1) & (2) we get,
⟹ [ ( - 5/3)² - 2(7/3) ] / (7/3)²
⟹ (25/9 - 14/3) * (3/7)²
⟹ (25 - 3 * 14)/3 * (9/49)
⟹ ( - 17)/3 * 9/49
⟹ - 51/49
∴ The value of 1/α² + 1/β² is - 51/49.
Answer:
Given : -
- Alph β are the zeros of the polynomial p(x)=3x^2+5x+7
To Find : -
- the value of 1/alph^2 +1/beta^2
Solution : -
P(X) = 3X² +5X +2
Here,
A = 3 , B = 5 and C = 2
Sum of zeroes = -B/A
Alpha + Beta = -5/3 -------(1)
And,
Product of zeroes = C/A
Alpha × Beta = 2/3 ---------(2)
Therefore,
( 1/ Alpha + 1/Beta )
=> ( Beta + Alpha / Alpha × Beta )
=> (-5/3 / 2/3)
=> -5/2.
HOPE IT WILL HELP YOU........ :-)