The number of polynomials having zeroes −2 and 5

Video Explanation

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The zeroes of the polynomial are:

−2 and 5

The number of polynomials having these zeroes.

If −2 and 5 are the zeroes of a polynomial, then the simplest polynomial having these zeroes is:

(x + 2)(x − 5)

= x² − 3x − 10

Now, any non-zero constant multiplied with this polynomial will also have the same zeroes.

So, the general polynomial having zeroes −2 and 5 is:

k(x + 2)(x − 5), where k ≠ 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 infinite.

Hence, there are infinitely many polynomials whose zeroes are −2 and 5.

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