Regardless of odd or even, any polynomial of positive order can have a maximum number of zeros equal to its order. For example, a cubic function can have as many as three zeros, but no more. This is known as the fundamental theorem of algebra.

## How many polynomials are there having 5 and minus 2 as zeros?

1 Answer. (d) Let p (x) = ax2 + bx + c be the required polynomial whose zeroes are -2 and 5. Hence, the required number of polynomials are infinite i.e., more than 3.

## How many polynomials are possible having zeros 2 and 1?

Answer Expert Verified Let the required Quadratic polynomial be f(x) = ax² + bx + c. ∴ b = -3 and a = 1. So, The equation is f(x) = x² – 3x + 2. ∴ Therefore, there are infinitely many polynomials i.e more than 3.

## How many polynomials can be formed with 5 as zeroes?

Infinitely many quadratic polynomials can be formed with -2 and 5 as zeroes.

## How many polynomials are there?

The three types of polynomials are: Monomial. Binomial. Trinomial.

## How many polynomials have zeros and 5 explain?

Let p(x)=ax2+bx+c be the required polynomial whose zeroes are -2 and 5. But we know that, if we multiply/divide any polynomial by any arbitary constant. Then, the zeroes of polynomial never change. Hence, the required number of polynomials are infinite i.e., more than 3.

## Which of the following is not a graph of quadratic polynomial?

Also, the curve of a quadratic polynomial crosses the X-axis on at most two points but in option (d) the curve crosses the X-axis on the three points, so it does not represent the quadratic polynomial.

## Which of the following is not a polynomial?

Answer (D) x + 3/x + anxn, where an ≠ 0, is called a polynomial in x of degree n. Here, a0, a1, a2, ……, an are real numbers and each power of x is a non-negative integer. Hence, x + 3/x is not a polynomial.

## Is Root 3x 2 2x a polynomial?

YES IT IS A POLYNOMIAL. BECAUSE THE POWER OF VARIABLE IS A NON NEGATIVE INTEGER.