Question

-2, 3, 2+i calculate a polynomial

-2, 3, 2+i

calculate a polynomial

Homework Answers

Answer #1

i hope you got your answer but if you need any further clarification in any step then let me know through comment section

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Find a polynomial function with real coefficients and least degree having zeros 2 – i, 3...
Find a polynomial function with real coefficients and least degree having zeros 2 – i, 3 and -1.
Write a polynomial F(x) with real coefficients in standard form that has zeros 2 and 3+i.
Write a polynomial F(x) with real coefficients in standard form that has zeros 2 and 3+i.
Lagrange Interpolation polynomial using python of degree 3 I understand the math for the question I...
Lagrange Interpolation polynomial using python of degree 3 I understand the math for the question I cannot seem to get the correct python code please help with python to solve For f (x) = x ln(x), (1) use appropriate Lagrange interpolating polynomial of degree three to approximate f(8.4). Use the following data: f(8.1) = 16.94410, f(8.3) = 17.56492, f(8.6) = 18.50515, f(8.7) = 18.82091. (2) use appropriate Newton interpolation polynomial again to redo the work. Everything has to be done...
i) Approximate the function f(x) = cos x by a Taylor polynomial of degree 3 at...
i) Approximate the function f(x) = cos x by a Taylor polynomial of degree 3 at a = π/3 ii) What is the maximum error when π/6 ≤ x ≤ π/2? (this is the continuation of part i))
5a: f(x) is a 4th degree polynomial with 3 distinct roots: -1, 2, 2^(.5)i ; and...
5a: f(x) is a 4th degree polynomial with 3 distinct roots: -1, 2, 2^(.5)i ; and f(1) = 12.       f(x) = ? Provide the answer in factored form.   5b: Suppose you don’t know that f(1) = 12.       What is the most general formula for f(x)?       Leave the answer in un-factored form.
Find a polynomial of degree 4 that has zeros of 1, 2, and 1+i
Find a polynomial of degree 4 that has zeros of 1, 2, and 1+i
problem 2 In the polynomial ring Z[x], let I = {a0 + a1x + ... +...
problem 2 In the polynomial ring Z[x], let I = {a0 + a1x + ... + anx^n: ai in Z[x],a0 = 5n}, that is, the set of all polynomials where the constant coefficient is a multiple of 5. You can assume that I is an ideal of Z[x]. a. What is the simplest form of an element in the quotient ring z[x] / I? b. Explicitly give the elements in Z[x] / I. c. Prove that I is not a...
Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.
Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.
Without a calculator, calculate "by hand" the exact value of the expression: -i√2(i+√3)e^((i*pi/3) + 1/2 ln(2))...
Without a calculator, calculate "by hand" the exact value of the expression: -i√2(i+√3)e^((i*pi/3) + 1/2 ln(2)) and present your result.
Find 3 solutions to the following polynomial equations: 1-3ix+(3ix)^2+(-3ix)^3=0. Answer must be in polar form; ex:...
Find 3 solutions to the following polynomial equations: 1-3ix+(3ix)^2+(-3ix)^3=0. Answer must be in polar form; ex: x1= 5*(cos(pi/2) + i*sin(pi/2) )
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT