Find the expansions of the following :

(i) (2x + 3y + 5)(2x + 3y - 5)

(ii) (6 - 4a - 7b)²

(iii) (7 - 3xy)³

(iv) (x + y + 2)³

(i) On solving,

⇒ (2x + 3y + 5)(2x + 3y - 5) = (2x + 3y)² - 5²

⇒ (2x + 3y + 5)(2x + 3y - 5) = 4x² + 9y² + 12xy - 25.

Hence, (2x + 3y + 5)(2x + 3y - 5) = 4x² + 9y² + 12xy - 25.

(ii) On solving,

⇒ (6 - 4a - 7b)² = (6 - 4a)² + (7b)² - 2(6 - 4a)(7b)

⇒ (6 - 4a - 7b)² = 36 + 16a² - 48a + 49b² - 14b(6 - 4a)

⇒ (6 - 4a - 7b)² = 36 + 16a² + 49b² - 48a + 56ab - 84b.

Hence, (6 - 4a - 7b)² = 36 + 16a² + 49b² - 48a + 56ab - 84b.

(iii) On solving,

⇒ (7 - 3xy)³ = (7)³ - (3xy)³ - 3(7)(3xy)(7 - 3xy)

⇒ (7 - 3xy)³ = 343 - 27x³y³ - 63xy(7 - 3xy)

⇒ (7 - 3xy)³ = 343 - 27x³y³ - 441xy + 189x²y².

Hence, (7 - 3xy)³ = 343 - 27x³y³ - 441xy + 189x²y².

(iv) On solving,

⇒ (x + y + 2)³ = (x)³ + (y + 2)³ + 3(x)(y + 2)(x + y + 2)

⇒ (x + y + 2)³ = x³ + y³ + 2³ + 3(y)(2)(y + 2) + (3xy + 6x)(x + y + 2)

⇒ (x + y + 2)³ = x³ + y³ + 8 + 6y(y + 2) + 3xy(x + y + 2) + 6x(x + y + 2)

⇒ (x + y + 2)³ = x³ + y³ + 8 + 6y² + 12y + 3x²y + 3xy² + 6xy + 6x² + 6xy + 12x

⇒ (x + y + 2)³ = x³ + y³ + 3x²y + 3xy² + 6x² + 6y² + 12xy + 12x + 12y + 8.

Hence, (x + y + 2)³ = x³ + y³ + 3x²y + 3xy² + 6x² + 6y² + 12xy + 12x + 12y + 8.