Let alpha and beta are the zeroes of a quadratic polynomial 2x2-5x-6 then form a quadratic polynomial whose zeroes are alpha + beta and alphabeta
Answers
Solution:
Note : Here I am using m and n
instead of Alfa and beta.
Given:
m and n are zeroes of a quadratic polynomial 2x²-5x-6
To find:
Form of a quadratic polynomial
whose zeroes are (m+n) and
mn
Explanation:
Compare given Quadratic polynomial 2x²-5x-6 with
ax²+bx+c , we get
a = 2 , b = -5 , c =-6
i )sum of the zeroes = -b/a
= -(-5)/2 = 5/2
m+n = 5/2 -----(1)
ii ) product of the zeroes = c/a
=>mn = (-6)/2 = -3 ---(2)
Now ,
(m+n) and mn are two zeroes,
iii ) Sum of the zeroes
= (m+n) + mn
= 5/2 + (-3)
= ( 5 - 6)/2
= -1/2 ----(3)
iv ) product of the zeroes
= (m+n)×mn
= (5/2) ×(-3)
= -15/2 ----(4)
_______________________
Form of a quadratic polynomial
is
k[x²-(sum of the zeroes)x+product of the zeroes]
______________________
Here,
k[ x²-(-1/2)x+(-15/2)]
For all real values of k it is true.
if k = 2,
2[x²+(1/2)x-15/2]
= 2x²+x-15
Therefore,
Required form of a polynomial
is 2x²+x-15
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