Number of Polynomials Having Given Zeroes

Video Explanation

The number of polynomials having zeroes \( -2 \) and \( 5 \) is:

If a polynomial has zeroes \( -2 \) and \( 5 \), then

\[ (x + 2)(x – 5) \]

is a factor of the polynomial.

Any non-zero constant multiple of this factor will also have the same zeroes.

So, the general polynomial is:

\[ k(x + 2)(x – 5), \quad \text{where } k \neq 0 \]

Since \(k\) can take infinitely many non-zero real values,

there are infinitely many such polynomials.

The number of polynomials having zeroes \( -2 \) and \( 5 \) is:

\[ \boxed{\text{Infinitely many}} \]

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