Take the help of our Subtracting Polynomials an online tool that determines the subtraction of polynomials (3g^4+5g^2h+1)-(3g^4-5g^2+8h) easily along with detailed solution steps on how the result 5 g^2 h + 5 g^2 - 8 h + 1 arrived.

**Ex: ** (x^2+2)-(x+8) (or) (x^3+5)-(x+6) (or) (x+2)-(x+8)

The given Expression is (3g^4+5g^2h+1)-(3g^4-5g^2+8h)

After removing all the brackets this expression can be written as 3*g^4+5*(g^2*h)+1-3*g^4 + 5*g^2 - 8*h.

After grouping similar terms we get - 3 g^4 + 3 g^4 + 5 g^2 h + 5 g^2 - 8 h + 1

After combining similar terms we get - 8 h + 5 g^2 + 5 g^2 h - 3 g^4 + 3 g^4 + 1

g^2 has similar terms 5 g^2

g^4 has similar terms (-3) g^4,3 g^4

h has similar terms - 8 h

g^2 h has similar terms 5 g^2 h

By adding all the similar terms we get 5 g^2 h + 5 g^2 - 8 h + 1

**1. What is the Polynomial Subtraction of (3g^4+5g^2h+1)-(3g^4-5g^2+8h)?**

The Polynomial Subtraction of (3g^4+5g^2h+1)-(3g^4-5g^2+8h) is 5 g^2 h + 5 g^2 - 8 h + 1.

**2. How can I find the Polynomial Subtraction of (3g^4+5g^2h+1)-(3g^4-5g^2+8h)?**

It is very easy to find the Polynomial Subtraction of (3g^4+5g^2h+1)-(3g^4-5g^2+8h), just simplify the like terms and subtract the constants and finally you will get the subtracted polynomial i.e., 5 g^2 h + 5 g^2 - 8 h + 1.

**3. Where can I obtain detailed solution steps for Polynomial Subtraction of (3g^4+5g^2h+1)-(3g^4-5g^2+8h)?**

The detailed steps for the Subtraction of Polynomials (3g^4+5g^2h+1)-(3g^4-5g^2+8h) are compiled exclusively on our output page.