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What is the product? (X^4)(3x^3-2)(4x^2+5x)

What is the product? (X^4)(3x^3-2)(4x^2+5x)
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What is the product? (X^4)(3x^3-2)(4x^2+5x)

User Abdulkarim Kanaan
by
7.7k points

2 Answers

3 votes

Given expression:
(x^4)(3x^3-2)(4x^2+5x).

We need to simplify the given expression by multiplying.


\mathrm{Expand}\:\left(3x^3-2\right)\left(4x^2+5x\right):\quad 12x^5+15x^4-8x^2-10x


=\left(x^4\right)\left(12x^5+15x^4-8x^2-10x\right)


\left(x^4\right)\left(12x^5+15x^4-8x^2-10x\right):\quad 12x^9+15x^8-8x^6-10x^5


=12x^9+15x^8-8x^6-10x^5

Therefore,
\left(x^4\right)\left(3x^3-2\right)\left(4x^2+5x\right)=\quad 12x^9+15x^8-8x^6-10x^5..

User Aemxdp
by
8.1k points
6 votes

Answer:


12x^9+15x^8-8x^6-10x^5

Explanation:

We have to find the product:


x^4* (3x^3-2)* (4x^2+5x)\\\\= x^4* (3x^3(4x^2+5x)-2(4x^2+5x))\\\\=x^4*(12x^5+15x^4-8x^2-10x)\\\\=12x^9+15x^8-8x^6-10x^5

User Foxichu
by
8.8k points
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