Find the complex zeros of the following polynomial function. Write f in factored form. x^4+2x^3+22x^2+50x-75 The complex zeros of f are ?

glamrockqueen7

glamrockqueen7

Answered question

2021-09-07

Find the complex zeros of the following polynomial function. Write f in factored form.
x4+2x3+22x2+50x75
The complex zeros of f are ?
Use the complex zeros to factor f.

Answer & Explanation

okomgcae

okomgcae

Skilled2021-09-08Added 93 answers

Step 1
Given function is,
f(x)=x4+2x3+22x2+50x75
The objective is to find the complex zeros of the function also write the function in factored form.
Step 2
Consider the function,
f(x)=x4+2x3+22x2+50x75
Since, x=1 satisfies the function.
Hence, (x1) is a factor of the function.
Then,
f(x)=x4+2x3+22x2+50x75
=x3(x1)+3x2(x1)+25x(x1)+75(x1)
=(x1)(x3+3x2+25x+75)
Now, x=3 also satisfy the function.
Hence, the (x+3) is a factor of the function.
Then function can be written as,
f(x)=(x1)(x3+3x2+25x+75)
=(x1)(x2(x+3)+25(x+3))
=(x1)(x+3)(x2+25)
Now, x=5iand5i satisfy the function.
Hence , function can be written as,
f(x)=(x1)(x+3)(x5i)(x+5i)
Therefore, the complex zeros of the function are x=5iand5i
Step 3
The function in factored form: f(x)=(x1)(x+3)(x5i)(x+5i)

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Multivariable calculus

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?