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Simplify the given poly nominal expressions and determined agree and number of terms in each expression

Simplify the given poly nominal expressions and determined agree and number of terms-example-1
User Fapps
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1 Answer

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1. The given polynomial is:


4x+2x^2(3x-5)

Start by applying the distributive property:


\begin{gathered} =4x+2x^2\cdot3x-2x^2\cdot5 \\ =4x+6x^3-10x^2 \end{gathered}

Now, rearrange the terms so that they're written in descending order of exponent:


6x^3-10x^2+4x

The degree of a polynomial is given by the largest exponent, then its degree is 3 and the number of terms is 3.

2. Polynomial:


(-3x^4+5x^3-12)+(7x^3-x^5+6)

Start by combining like terms:


\begin{gathered} =-3x^4+(5x^3+7x^3)-x^5-12+6 \\ =-3x^4+12x^3-x^5-6 \end{gathered}

And rearrange the terms in descending order of exponent:


-x^5-3x^4+12x^3-6

The degree is 5 and the number of terms is 4.

3. Polynomial:


(3x^2-3)(3x^2+3)

It is the factored form of the difference of two squares:


(a-b)(a+b)=a^2-b^2

By replacing the known values we have:


\begin{gathered} (3x^2-3)(3x^2+3)=(3x^2)^2-3^3 \\ =9x^4-9 \end{gathered}

Then the degree is 4 and the number of terms is 2.

User Kiran Mathew
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