justify a polynomial can have more than one zero
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justify a polynomial can have more than one zero
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Explanation:
We can say that statement is true " Every linear polynomial has one and only one zero. " d ) A polynomial can have more than one zero. Let we have a polynomial x2 -2x - 3 . So we can say that statement is true " A polynomial can have more than one zero
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Answer:
False, because zero of a polynomial can be any real number e.g., p(x) = x – 2, then 2 is a zero of polynomial p(x). e.g., p(x) = x2 -2, as degree pf p(x) is 2 ,so it has two degree, so it has two zeroes i.e., √2 and -√2. ... = 4x3 + 2x + 2 which is not a polynomial of degree 4.