# Addition of Polynomials 16t^2-105t+34+5t^2-151t+88

Polynomial addition is the process of adding terms from two or more algebraic equations while maintaining the sign of each term. Here you can check the answer for Addition of Polynomials 26t^2-215t+97+9t^2-23t+8.

**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

## How to Find the Addition of Polynomials 16t^2-105t+34+5t^2-151t+88

Given that,

16t^2-105t+34+5t^2-151t+88

We obtain (- 21 t^2 - 46 t - 34) + 88 by grouping related terms.

We obtain - 151 t + 5 t^2 + 16 t^2 - 105 t + 34 + 88 by combining related terms.

t^2 has related terms - 21 t^2 - 46 t - 34

Having added all the related terms, we arrive at 21 t^2 - 256 t + 122

**So, 16t^2-105t+34+5t^2-151t+88 = 21 t^2 - 256 t + 122**

### FAQs on Addition of Polynomials -16t^2-105t+34+5t^2-151t+88

**1. What is the result of polynomials - 16t^2-105t+34+5t^2-151t+88?**

Addition of Polynomials -**16t^2-105t+34+5t^2-151t+88** is - **21 t^2 - 256 t + 122**

**2. How do you quickly add the polynomials -16t^2-105t+34+5t^2-151t+88?**

Add polynomials -**16t^2-105t+34+5t^2-151t+88** by similar grouping related words and adding them all together.

**3. Where can I find a clear explanation of how to add the polynomials -16t^2-105t+34+5t^2-151t+88?**

On our page, you can get a full explanation of how to add the polynomials -**16t^2-105t+34+5t^2-151t+88**