Factorise the following:

32a²x³ - 8b²x³ - 4a²y³ + b²y³.

32a²x³ - 8b²x³ - 4a²y³ + b²y³ = 8x³(4a² - b²) - y³(4a² - b²)

= (4a² - b²)(8x³ - y³)

= [(2a)² - (b)²][(2x)³ - (y)³]

We know that,

a³ - b³ = (a - b)(a² + ab + b²)

a² - b² = (a - b)(a + b).

∴ [(2a)² - (b)²][(2x)³ - (y)³] = (2a - b)(2a + b)(2x - y)[(2x)² + 2xy + y²]

= (2a - b)(2a + b)(2x - y)(4x² + 2xy + y²).

Hence, 32a²x³ - 8b²x³ - 4a²y³ + b²y³ = (2a - b)(2a + b)(2x - y)(4x² + 2xy + y²).