Write a polynomial f(x) that meets the given conditions. Answers may vary. Degree 3 polynomial with...
Write the polynomial f(x) that meets the given conditions. Answers may vary. Degree 3 polynomial with zeros of -5, 3i, and -3i. f(x) = 0
3) Write a polynomial f(x) that meets the given conditions. Answers may vary. 3) Degree 2 polynomial with zeros 212 and -222 A) S(x) = x2 + 472x+8 B) f(x) = x2-8 9 S(x) = x² + 8 D) S(x) = x2-11/2x+8 4) Degree 3 polynomial with zeros 6, 21, and -2i A) S(x) => x3 + 6x2 + 4x + 24 f(x)= x2 - 6x2 + 4x - 24 B) /(x) = x2 - 6x2 - 4x + 24...
Write a polynomial f(x) that satisfies the given conditions. Polynomial of lowest degree with zeros of (multiplicity 2) and 1 (multiplicity 1) and with f(0) = -2. 4 $(x) = a
write a polynomial f(x) that satisfies the given conditions degree 3 polynomial with integer coefficients with zeros 4i and 2over 7
ZEROS OF POLYNOMIAL FUNCTIONS 1. Find a polynomial function f(x) of degree 3 that has the indicated zeros and satisfies the given condition Zeros: -5, 2, 4 Condition: f(3) = -24 f(x) = 2. Find a polynomial function f(x) of degree 3 that has the indicated zeros and satisfies the given condition. Zeros: -1, 2, 3 Condition: f(-2) = 80 f(x) = 3. Find a polynomial function f(x) of degree 3 that has the indicated zeros and satisfies the given...
Find a polynomial of the specified degree that satisfies the given conditions. Degree 4; zeros −3, 0, 1, 4; coefficient of x3 is 4
Find a polynomial function of degree 3 with real coefficients that satisfies the given conditions. See Example 4. 5) Zeros of 2 f (x) = - 3 and 5: f(3) = 6
Find an nth-degree polynomial function with real coefficients satisfying the given conditions. If you are using a graphing utility, use it to graph the function and verify the real zeros and the given function value. n= 3; 4 and 2 i are zeros; f(1) = 15 f(x)=0
Find the complete factored form of the polynomial f(x) that satisfies the given conditions. Degree 3, leading coefficient -5, zeros at 9,2-8 i and 2 +8 i. O A. f(x)= - 5(x- 9)(x2 - 4x +68) OB. f(x) = -5(x +9)(x - 2 - 8i)(x - 2 +81) O c. f(x) = -5(x -9)(x - 2 - 8 i)(x - 2 + 8 i) OD. f(x) = - 5(x +9)(x2 - 4x+68)
Form a polynomial f(x) with real coefficients having the given degree and zeros. Degree 4; zeros: 1, multiplicity 2; 2i Enter the polynomial. f(x) = all (Type an expression using x as the variable. Use integers or fractions for any numbers in Its