Find out the Polynomial Root of -16t^2+24t+6
The polynomial root can be easily found by following the below-mentioned procedure. In this article, you will get to know about the polynomial root and the detailed steps to find out the Polynomial Root of -16t^2+24t+6.
Detailed solution to Find out the Polynomial Root of -16t^2+24t+6
The given polynomial is -16t^2+24t+6
The polynomial can be written as - 16 t^2 + 24 t + 6
After factoring polynomials we get - 2 (8 t^2 - 12 t - 3)
By factoring the polyomial as below
Polynomial Roots Calculator is a set of methods aimed at finding values of x for which F(x)=0
Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers x which can be expressed as the quotient of two integers
By factoring polynomial we get - 2 (8 t^2 - 12 t - 3)
After spliting the factors into indivisual expression
8 t^2 - 12 t - 3= 0
By making each equation set to "0" we have calculate values of x
8 t^2 - 12 t - 3= 0 has root i.e [ 3/4 - √15/4, \ 3/4 + √15/4]
FAQs on Find out the Polynomial Root of -16t^2+24t+6
1. What are the roots of Polynomial -16t^2+24t+6?
The roots of Polynomial -16t^2+24t+6 are [3/4 - √(15)/4, 3/4 + √(15)/4].
2. How do you find Polynomial Roots -16t^2+24t+6?
To find the polynomial roots of -16t^2+24t+6, we have to take u = b^2 and solve the quadratic equation to get the values of b.