find the zerows of the polynomial if f(x) =√3x²+5x-8√3 and verify the relationship betweentm the zeroes and its co efficient
Answers
Step-by-step explanation:
We have,
4√3x2 + 5x - 2√3
= 4√3x2 + 8x - 3x - 2√3
= 4x (√3x + 2) - √3(√3x + 2)
= (4x - √3)(√3x + 2)
x= √3/4, x=2/√3
Answer:
x = -8/√3 , x = √3
Note:
★ The possible values of the variable for which the polynomial becomes zero are called its zeros.
★ A quadratic polynomial can have atmost two zeros.
★ To find the zeros of the given polynomial , equate it to zero .
★ If A and B are the zeros of the quadratic polynomial p(x) = ax² + bx + c ; then ;
• Sum of zeros , (A+B) = -b/a
• Product of zeros , (A•B) = c/a
Solution:
Here ,
The given quadratic polynomial is ;
f(x) = √3x² + 5x - 8√3
Clearly ,
a = √3
b = 5
c = -8
Now,
Let's find the zeros of the given quadratic polynomial by equating it to zero.
Thus,
=> f(x) = 0
=> √3x² + 5x - 8√3 = 0
=> √3x² + 8x - 3x - 8√3 = 0
=> x(√3x + 8) - √3(√3x + 8) = 0
=> (√3x + 8)(x - √3) = 0
=> x = -8/√3 , x = √3
Now,
Sum of zeros = -8/√3 + √3
= (-8 + 3)/√3
= -5/√3
Also,
-b/a = -5/√3
Clearly,
Sum of zeros = -b/a
Now,
Product of zeros = (-8/√3)•√3
= -8
Also,
c/a = -8√3/√3 = -8
Clearly,
Product of zeros = c/a