Factor: 3x4y3 – 48y3. Solution: 3x4y3– 48y3. = 3y3(x4 – 16). = 3y3[(x2)2 - 42]. = 3y3(x2 + 4)(x2 - 4). = 3y3(x2 + 4)(x2 - 22). = 3y3(x2 + 4)(x + 2)(x -2). whats the answer?

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asked Nov 9, 2021 135k views

2 votes

Factor: 3x4y3 – 48y3.

Solution:

3x4y3– 48y3.

= 3y3(x4 – 16).

= 3y3[(x2)2 - 42].

= 3y3(x2 + 4)(x2 - 4).

= 3y3(x2 + 4)(x2 - 22).

= 3y3(x2 + 4)(x + 2)(x -2).
whats the answer?

Mathematics
high-school

Harsh Bhavsar asked

by Harsh Bhavsar

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1 Answer

6 votes

Answer:

The answer is
$\mathbf{3y^3(x^2 + 4)(x + 2)(x -2)}$

Explanation:

We need to factor
3x^4y^3 - 48y^3

Solution:

3x^4y^3- 48y^3= 3y^3(x^4 – 16)= 3y^3[(x^2)^2 - 4^2]= 3y^3(x^2 + 4)(x^2 - 4)= 3y^3(x^2 + 4)(x^2 - 2^2)= 3y^3(x^2 + 4)(x + 2)(x -2)

So, the factorisation of
3x^4y^3 - 48y^3 is
$\mathbf{3y^3(x^2 + 4)(x + 2)(x -2)}$

The answer is
$\mathbf{3y^3(x^2 + 4)(x + 2)(x -2)}$

Dalon answered Nov 15, 2021

by Dalon

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