Find the Polynomial -2x^3-x^13+6+2x^12 in Ascending Order
Want to know how to arrange the Polynomial -2x^3-x^13+6+2x^12 in Ascending Order? Well, you come to the right article. With the help of our detailed guide below, you will learn steps to Find the Polynomial -2x^3-x^13+6+2x^12 in Ascending Order. Keep reading to learn more.
Ex: x^5+x^5+1+x^5+x^3+x (or) x^5+3x^5+1+x^6+x^3+x (or) x^3+x^5+1+x^3+x^3+x
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Detailed Solution for Finding Polynomial -2x^3-x^13+6+2x^12 in Ascending Order
To arrange the polynomial in ascending order, all you have to do is find each variable’s exponent value and arrange them from lower values to higher values.
In the ascending order of exponents, we can arrange -2x^3-x^13+6+2x^12 like this.
First, the exponents for each part of the polynomial are as follows:
2 x^12 —-> 12
- x^13 —-> 13
- 2 x^3 —-> 1
6 —-> 0
So, the degrees are 0, 1, 12, 13, when arranged in ascending order. Now match them to the variables.
Therefore, the ascending order of polynomial -2x^3-x^13+6+2x^12 is 6-2x^3+2 x^12-x^13
Frequently Asked Questions on Ascending Order Polynomial of -2x^3-x^13+6+2x^12
1. What is the Polynomial -2x^3-x^13+6+2x^12 in Ascending Order ?
The polynomial -2x^3-x^13+6+2x^12 in ascending order is 6-2x^3+2 x^12-x^13.
2. How to Find the Polynomial -2x^3-x^13+6+2x^12 in Ascending Order?
First, find the individual exponent degrees for each part of the polynomial. Then, arrange the variables according to the ascending order of their exponents from low to high values. You will get 6-2x^3+2 x^12-x^13 as the answer.
3. Where can I get the method to arrange polynomial -2x^3-x^13+6+2x^12 in ascending order?
Refer our page to get the simple method to arrange polynomial -2x^3-x^13+6+2x^12 in ascending order.