## Which Of The Following Represents The Zeros Of F(X) = 6×3 + 25×2 − 24x + 5?

The values of x for which f(x) =0, are roots or zeroes of the polynomial. f(1)= 6 +25 -24+5= 12. f(-1)= -6 +25 +24 +5=48.

## Which of the following represents the zeros of F x 6×3 − 31×2 4x 5 1 point?

So, (x – 5) is a factor. Therefore, 5, -1/3 and 1/2 are the zeros of the function.

## Which of the following represents the zeros of f/x )= 6x 3 29x 2 6x 5?

5, 1/3 , – 1/2 represents the zeros of f(x) = 6×3 – 29×2 – 6x + 5.

## How do you find zeros?

The values of x that represent the set equation are the zeroes of the function. To find the zeros of a function, find the values of x where f(x) = 0.

## Is x =- 3 zero of the polynomial P x )= 2×2 5x 3?

therefore x=-3 is not the zero of the given polynomial.

## How do you find the real zeros of a function?

Graphically, the real zero of a function is where the graph of the function crosses the x‐axis; that is, the real zero of a function is the x‐intercept(s) of the graph of the function. Find the zeros of the function f ( x) = x 2 – 8 x – 9. Find x so that f ( x) = x 2 – 8 x – 9 = 0.

## Which of this is a polynomial whose zeros are 1 by 3 and minus 3 by 4?

x2 – x – 12 is the Quadratic Polynomial Whose zeroes are -3 and 4.

## How many zeros does the polynomial P x )= 2 have?

There are always two zeros for any quadratic polynomial.

## How many zeros does a function have?

According to the “Fundamental Theorem of Algebra”, a polynomial of degree n has n zeroes. The degree is the value of the greatest exponent of any term (except the constant ) in the polynomial. Your function is an eighth-degree polynomial, so it has eight zeroes.

## Which of the following is a zero of the polynomial 2×2 5x 3?

The largest power of the variable x is referred to as a polynomial’s degree. ∴ Zeros of 2 – 5x + 3 are 1 and 3/2.

## Is X equal to minus 3 solution of equation 2 x square 5 x 3 equal to zero?

Therefore, x = -3 is the solution of the equation.

## How do you solve a 3rd power equation?

The general strategy for solving a cubic equation is to reduce it to a quadratic equation, and then solve the quadratic by the usual means, either by factorising or using the formula. are all cubic equations. Just as a quadratic equation may have two real roots, so a cubic equation has possibly three.

## How do you find nonreal zeros of a function?

Algebraically, factor the polynomial and set it equal to zero to find the zeroes. Note that imaginary numbers do not appear on a graph and, therefore, imaginary zeroes can only be found by solving for x algebraically.

## What is a real zero or root?

A zero or root (archaic) of a function is a value that makes it zero. For example, the zeros of x2−1 are x=1 and x=−1. The zeros of z2+1 are z=i and z=−i. Sometimes we restrict our domain, so limiting what type of zeros we will accept. For example, z2+1 has no real zeros (because its two zeros are not real numbers).

## What does find the zeros mean?

The zeros of a function f(x) are the values of x for which the value the function f(x) becomes zero i.e. f(x)=0. Consequently, we can say that if x be the zero of the function then f(x)=0. To understand the definition of the roots of a function let us take the example of the function y=f(x)=x.

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