Find the zeros of the polynomial 5 root 5 x square + 30 x + 8 root 5
Answers
Answered by
258
hope u understand let............
Attachments:
nishant5788:
om
Answered by
127
Answer:
Zeroes of the polynomial are ,
Step-by-step explanation:
Given equation,
5 root 5 x square + 30x + 8 root 5
This can be written as ,
5√5 x² + 30 x + 8√5
We will factorise the given equation by splitting the middle term method
5√5 x² + 20 x + 10 x + 8√5
10 x can be written as ( 5 * 2 ) x
5√5 x² + 20 x + ( 5 * 2 ) x + 8√5
Also, 5 can be written as √5 * √5
So now the Equation becomes :
= 5√5 x² + 20 x + ( √5 * √5 * 2 ) x + 8√5
= 5x ( √5 x + 4 ) + √5 * 2 ( √5 x + 4 )
= 5x ( √5 x + 4 ) + 2√5 ( √5 x + 4 )
= ( 5x + 2√5 ) ( √5 x + 4 )
Zeroes are :
5x + 2√5 = 0
5x = - 2√5
x =
Also,
√5 x + 4 = 0
√5 x = - 4
x =
Multiplying and dividing by √5
x =
x =
Hence,
Zeroes of the polynomial are ,
Similar questions
CBSE BOARD X,
7 months ago
Math,
1 year ago