Rewrite the following polynomial in standard form.
start fraction, x, cubed, divided by, 5, end fraction, minus, 10, minus, x
5
x
3
−10−x
The polynomial in standard form is:
1/5x^3 - x - 10
To write the given polynomial in standard form, we need to arrange the terms in descending order of their degree.
The given polynomial is:
(start fraction x cubed over 5 end fraction) - 10 - x
First, let's rewrite the fraction as:
(x^3) / 5 - 10 - x
Now, rearrange the terms in descending order of their degree:
x^3 / 5 - x - 10
Therefore, the polynomial in standard form is:
x^3 / 5 - x - 10.
To rewrite the polynomial in standard form, we need to rearrange the terms in descending order of exponents.
The given polynomial is: (x^3 / 5) - 10 - x
To rewrite it in standard form, we have to simplify and combine the terms.
First, let's rewrite the fraction (x^3 / 5) as (1/5) * x^3:
(1/5) * x^3 - 10 - x
Now, let's combine the x^3 term and the x term:
(1/5) * x^3 - x - 10
Finally, rearranging the terms in descending order of exponents gives us the polynomial in standard form:
x^3/5 - x - 10