Question

if a and b are zeros of polynomical x^2+4x+3 find the polynomial whoseZerols are 1+a/b 1+B/a​

Answer 1

Step-by-step explanation:

Correct option is

D

3x

2

−16x+16

Since α and β are the zeros of the quadratic polynomial x

2

+4x+3

Then, α+β=−4,αβ=3

Now, the of sum of the zeros of new polynomial is

=1+

α

β

+1+

β

α

=

αβ

αβ+β

2

+αβ+α

2

=

αβ

α

2

+β

2

+2αβ

=

αβ

(α+β)

2

=

3

(−4)

2

=

3

16

Also, Product of the zeros of new polynomial is

=2+

αβ

α

2

+β

2

=

αβ

2αβ+α

2

+β

2

=

αβ

(α+β)

2

=

3

(−4)

2

=

3

16

Therefore, the required polynomial is

k×[x

2

−(sum of the zeros)x+product of zeros]

⇒k×[x

2

−

3

16

x+

3

16

]

⇒3×(x

2

−

3

16

x+

3

16

) (if k=3)

⇒3x

2

−16x+16