The polynomial with the given zeros is [tex]x^3 - (25/4)x^2 + (19/4)ix + (30/4)i.[/tex]
To find the factors corresponding to the given zeros, we can use the fact that if a number is a zero of a polynomial, then (x - zero) is a factor of the polynomial.
Given zeros: 5, -3/4, 2i
For the zero 5, the corresponding factor is (x - 5).
For the zero -3/4, the corresponding factor is (x + 3/4).
For the zero 2i, the corresponding factor is (x - 2i).
To find the complete polynomial, we can multiply these factors together:
[tex](x - 5)(x + 3/4)(x - 2i)[/tex]
To simplify the polynomial, we can multiply the factors using the distributive property:
[tex](x^2 - 5x + (3/4)x - 15/4)(x - 2i)[/tex]
Combining like terms:
[tex](x^2 - (17/4)x - 15/4)(x - 2i)[/tex]
Expanding further:
[tex]x^3 - (17/4)x^2 - (15/4)x - 2ix^2 + (34/4)ix + (30/4)i[/tex]
Simplifying and combining like terms, we have the final polynomial:
[tex]x^3 - (25/4)x^2 + (19/4)ix + (30/4)i[/tex]
Therefore , the polynomial with the given zeros is [tex]x^3 - (25/4)x^2 + (19/4)ix + (30/4)i.[/tex]
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